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2476 lines
70 KiB
2476 lines
70 KiB
//========= Copyright Valve Corporation, All rights reserved. ============// |
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// |
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// Purpose: |
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// |
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// $NoKeywords: $ |
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// |
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//=============================================================================// |
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#include "cbase.h" |
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#include "cmodel.h" |
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#include "physics_trace.h" |
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#include "ivp_surman_polygon.hxx" |
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#include "ivp_compact_ledge.hxx" |
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#include "ivp_compact_ledge_solver.hxx" |
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#include "ivp_compact_surface.hxx" |
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#include "tier0/vprof.h" |
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#include "mathlib/ssemath.h" |
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#include "tier0/tslist.h" |
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// memdbgon must be the last include file in a .cpp file!!! |
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#include "tier0/memdbgon.h" |
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// this skips the sphere tree stuff for tracing |
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#define DEBUG_TEST_ALL_LEDGES 0 |
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// this skips the optimization that shrinks the ray as each intersection is encountered |
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#define DEBUG_KEEP_FULL_RAY 0 |
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// this skips the optimization that looks up the first vert in a cubemap |
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#define USE_COLLIDE_MAP 1 |
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// objects with small numbers of verts build a cache of pre-transformed verts |
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#define USE_VERT_CACHE 1 |
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#define USE_RLE_SPANS 1 |
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// UNDONE: This is a boost on PC, but doesn't work yet on x360 - investigate |
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#define SIMD_MATRIX 0 |
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// turn this on to get asserts in the low-level collision solver |
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#define CHECK_TOI_CALCS 0 |
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#define BRUTE_FORCE_VERT_COUNT 128 |
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// NOTE: This is in inches (HL units) |
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#define TEST_EPSILON (g_PhysicsUnits.collisionSweepIncrementalEpsilon) |
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struct simplexvert_t |
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{ |
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Vector position; |
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unsigned short testIndex : 15; |
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unsigned short sweepIndex : 1; |
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unsigned short obstacleIndex; |
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}; |
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struct simplex_t |
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{ |
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simplexvert_t verts[4]; |
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int vertCount; |
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inline bool PointSimplex( const simplexvert_t &newPoint, Vector *pOut ); |
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inline bool EdgeSimplex( const simplexvert_t &newPoint, int outIndex, const Vector &edge, Vector *pOut ); |
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inline bool TriangleSimplex( const simplexvert_t &newPoint, int outIndex, const Vector &faceNormal, Vector *pOut ); |
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bool SolveGJKSet( const simplexvert_t &newPoint, Vector *pOut ); |
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bool SolveVoronoiRegion2( const simplexvert_t &newPoint, Vector *pOut ); |
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bool SolveVoronoiRegion3( const simplexvert_t &newPoint, Vector *pOut ); |
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bool SolveVoronoiRegion4( const simplexvert_t &newPoint, Vector *pOut ); |
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Vector ClipRayToTetrahedronBase( const Vector &dir ); |
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Vector ClipRayToTetrahedron( const Vector &dir ); |
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float ClipRayToTriangle( const Vector &dir, float epsilon ); |
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}; |
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class CTraceCone : public ITraceObject |
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{ |
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public: |
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CTraceCone( const truncatedcone_t &cone, const Vector &translation ) |
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{ |
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m_cone = cone; |
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m_cone.origin += translation; |
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float cosTheta; |
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SinCos( DEG2RAD(m_cone.theta), &m_sinTheta, &cosTheta ); |
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m_radius = m_cone.h * m_sinTheta / cosTheta; |
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m_centerBase = m_cone.origin + m_cone.h * m_cone.normal; |
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} |
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virtual int SupportMap( const Vector &dir, Vector *pOut ) const |
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{ |
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Vector unitDir = dir; |
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VectorNormalize(unitDir); |
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float dot = DotProduct( unitDir, m_cone.normal ); |
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// anti-cone is -normal, angle = 90 - theta |
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// If the normal is in the anti-cone, then return the apex |
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// not in anti-cone, support map is on the surface of the disc |
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if ( dot > -m_sinTheta ) |
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{ |
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unitDir -= m_cone.normal * dot; |
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float len = VectorNormalize( unitDir ); |
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if ( len > 1e-4f ) |
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{ |
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*pOut = m_centerBase + (unitDir * m_radius); |
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return 0; |
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} |
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*pOut = m_centerBase; |
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return 0; |
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} |
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// outside the cone's angle, support map is on the surface of the cone |
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*pOut = m_cone.origin; |
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return 0; |
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} |
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// BUGBUG: Doesn't work! |
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virtual Vector GetVertByIndex( int index ) const { return m_cone.origin; } |
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virtual float Radius( void ) const { return m_cone.h + m_radius; } |
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truncatedcone_t m_cone; |
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float m_radius; |
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float m_sinTheta; |
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Vector m_centerBase; |
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}; |
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// really this is indexing a vertex, but the iteration code needs a triangle + edge index. |
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// edge is always 0-2 so return it in the bottom 2 bits |
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static unsigned short GetPackedIndex( const IVP_Compact_Ledge *pLedge, const IVP_U_Float_Point &dir ) |
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{ |
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const IVP_Compact_Poly_Point *RESTRICT pPoints = pLedge->get_point_array(); |
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const IVP_Compact_Triangle *RESTRICT pTri = pLedge->get_first_triangle(); |
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const IVP_Compact_Edge *RESTRICT pEdge = pTri->get_edge( 0 ); |
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int best = pEdge->get_start_point_index(); |
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float bestDot = pPoints[best].dot_product( &dir ); |
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int triCount = pLedge->get_n_triangles(); |
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const IVP_Compact_Triangle *RESTRICT pBestTri = pTri; |
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// this loop will early out, but keep it from being infinite |
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int i; |
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// hillclimbing search to find the best support vert |
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for ( i = 0; i < triCount; i++ ) |
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{ |
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// get the index to the end vert of this edge (start vert on next edge) |
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pEdge = pEdge->get_prev(); |
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int stopVert = pEdge->get_start_point_index(); |
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// loop through the verts that can be reached along edges from this vert |
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// stop if you get back to the one you're starting on. |
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int vert = stopVert; |
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do |
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{ |
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float dot = pPoints[vert].dot_product( &dir ); |
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if ( dot > bestDot ) |
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{ |
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bestDot = dot; |
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best = vert; |
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pBestTri = pEdge->get_triangle(); |
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break; |
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} |
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// tri opposite next edge, same starting vert as next edge |
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pEdge = pEdge->get_opposite()->get_prev(); |
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vert = pEdge->get_start_point_index(); |
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} while ( vert != stopVert ); |
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// if you exhausted the possibilities for this vert, it must be the best vert |
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if ( vert != best ) |
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break; |
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} |
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int triIndex = pBestTri - pLedge->get_first_triangle(); |
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int edgeIndex = 0; |
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// just do a search for the edge containing this vert instead of storing it along the way |
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for ( i = 0; i < 3; i++ ) |
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{ |
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if ( pBestTri->get_edge(i)->get_start_point_index() == best ) |
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{ |
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edgeIndex = i; |
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break; |
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} |
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} |
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return (unsigned short) ( (triIndex<<2) + edgeIndex ); |
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} |
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void InitLeafmap( IVP_Compact_Ledge *pLedge, leafmap_t *pLeafmapOut ) |
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{ |
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pLeafmapOut->pLeaf = pLedge; |
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pLeafmapOut->vertCount = 0; |
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pLeafmapOut->flags = 0; |
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pLeafmapOut->spanCount = 0; |
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if ( pLedge && pLedge->is_terminal() ) |
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{ |
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// for small numbers of verts it's much faster to simply do dot products with all verts |
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// since the best case for hillclimbing is to touch the start vert plus all neighbors (avg_valence+1 dots) |
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// in t |
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int triCount = pLedge->get_n_triangles(); |
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// this is a guess that anything with more than brute_force * 4 tris will have at least brute_force verts |
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if ( triCount <= BRUTE_FORCE_VERT_COUNT*4 ) |
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{ |
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Assert(triCount>0); |
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int minV = MAX_CONVEX_VERTS; |
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int maxV = 0; |
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for ( int i = 0; i < triCount; i++ ) |
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{ |
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const IVP_Compact_Triangle *pTri = pLedge->get_first_triangle() + i; |
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for ( int j = 0; j < 3; j++ ) |
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{ |
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const IVP_Compact_Edge *pEdge = pTri->get_edge( j ); |
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int v = pEdge->get_start_point_index(); |
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if ( v < minV ) |
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{ |
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minV = v; |
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} |
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if ( v > maxV ) |
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{ |
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maxV = v; |
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} |
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} |
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} |
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int vertCount = (maxV-minV) + 1; |
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// max possible verts is < 48, so this is just here for some real failure |
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// or vert sharing with a large collection of convexes. In that case the |
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// number could be high, but this approach to implementing support is invalid |
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// because the vert range is polluted |
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if ( vertCount < BRUTE_FORCE_VERT_COUNT ) |
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{ |
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char hasVert[BRUTE_FORCE_VERT_COUNT]; |
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memset(hasVert, 0, sizeof(hasVert[0])*vertCount); |
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for ( int i = 0; i < triCount; i++ ) |
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{ |
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const IVP_Compact_Triangle *pTri = pLedge->get_first_triangle() + i; |
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for ( int j = 0; j < 3; j++ ) |
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{ |
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// mark each vert in the list |
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const IVP_Compact_Edge *pEdge = pTri->get_edge( j ); |
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int v = pEdge->get_start_point_index(); |
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hasVert[v-minV] = true; |
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} |
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} |
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// now find the vertex spans and encode them |
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byte spans[BRUTE_FORCE_VERT_COUNT]; |
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int spanIndex = 0; |
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char has = hasVert[0]; |
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Assert(has); |
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byte count = 1; |
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for ( int i = 1; i < vertCount && spanIndex < BRUTE_FORCE_VERT_COUNT; i++ ) |
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{ |
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// each change of state is a new span |
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if ( has != hasVert[i] ) |
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{ |
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spans[spanIndex] = count; |
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has = hasVert[i]; |
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count = 0; |
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spanIndex++; |
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} |
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count++; |
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Assert(count < 255); |
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} |
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// rle spans only supported with vertex caching |
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#if USE_VERT_CACHE && USE_RLE_SPANS |
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if ( spanIndex < BRUTE_FORCE_VERT_COUNT ) |
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#else |
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if ( spanIndex < 1 ) |
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#endif |
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{ |
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spans[spanIndex] = count; |
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spanIndex++; |
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pLeafmapOut->SetRLESpans( minV, spanIndex, spans ); |
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} |
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} |
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} |
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} |
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if ( !pLeafmapOut->HasSpans() ) |
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{ |
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// otherwise make a 8-way directional map to pick the best start vert for hillclimbing |
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pLeafmapOut->SetHasCubemap(); |
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for ( int i = 0; i < 8; i++ ) |
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{ |
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IVP_U_Float_Point tmp; |
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tmp.k[0] = ( i & 1 ) ? -1 : 1; |
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tmp.k[1] = ( i & 2 ) ? -1 : 1; |
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tmp.k[2] = ( i & 4 ) ? -1 : 1; |
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pLeafmapOut->startVert[i] = GetPackedIndex( pLedge, tmp ); |
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} |
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} |
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} |
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void GetStartVert( const leafmap_t *pLeafmap, const IVP_U_Float_Point &localDirection, int &triIndex, int &edgeIndex ) |
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{ |
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if ( !pLeafmap || !pLeafmap->HasCubemap() ) |
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return; |
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// map dir to index |
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int cacheIndex = (localDirection.k[0] < 0 ? 1 : 0) + (localDirection.k[1] < 0 ? 2 : 0) + (localDirection.k[2] < 0 ? 4 : 0 ); |
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triIndex = pLeafmap->startVert[cacheIndex] >> 2; |
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edgeIndex = pLeafmap->startVert[cacheIndex] & 0x3; |
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} |
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CTSPool<CVisitHash> g_VisitHashPool; |
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CVisitHash *AllocVisitHash() |
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{ |
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return g_VisitHashPool.GetObject(); |
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} |
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void FreeVisitHash(CVisitHash *pFree) |
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{ |
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if ( pFree ) |
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{ |
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g_VisitHashPool.PutObject(pFree); |
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} |
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} |
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//----------------------------------------------------------------------------- |
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// Purpose: Implementation for Trace against an IVP object |
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//----------------------------------------------------------------------------- |
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class CTraceIVP : public ITraceObject |
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{ |
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public: |
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CTraceIVP( const CPhysCollide *pCollide, const Vector &origin, const QAngle &angles ); |
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~CTraceIVP() |
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{ |
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// if ( m_pVisitHash ) |
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// FreeVisitHash(m_pVisitHash); |
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} |
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virtual int SupportMap( const Vector &dir, Vector *pOut ) const; |
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virtual Vector GetVertByIndex( int index ) const; |
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// UNDONE: Do general ITraceObject center/offset computation and move the ray to account |
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// for this delta like we do in TraceSweepIVP() |
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// Then we can shrink the radius of objects with mass centers NOT at the origin |
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virtual float Radius( void ) const |
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{ |
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return m_radius; |
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} |
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inline float TransformLengthToLocal( float length ) |
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{ |
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return ConvertDistanceToIVP( length ); |
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} |
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// UNDONE: Optimize this by storing 3 matrices? (one for each transform that includes rot/scale for HL/IVP)? |
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// UNDONE: Not necessary if we remove the coordinate conversion |
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inline void TransformDirectionToLocal( const Vector &dir, IVP_U_Float_Point &local ) const |
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{ |
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IVP_U_Float_Point tmp; |
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ConvertDirectionToIVP( dir, tmp ); |
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m_matrix.vimult3( &tmp, &local ); |
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} |
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inline void RotateRelativePositionToLocal( const Vector &delta, IVP_U_Float_Point &local ) const |
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{ |
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IVP_U_Float_Point tmp; |
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ConvertPositionToIVP( delta, tmp ); |
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m_matrix.vimult3( &tmp, &local ); |
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} |
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inline void TransformPositionToLocal( const Vector &pos, IVP_U_Float_Point &local ) const |
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{ |
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IVP_U_Float_Point tmp; |
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ConvertPositionToIVP( pos, tmp ); |
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m_matrix.vimult4( &tmp, &local ); |
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} |
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inline void TransformPositionFromLocal( const IVP_U_Float_Point &local, Vector &out ) const |
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{ |
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VectorTransform( *(Vector *)&local, *((const matrix3x4_t *)&m_ivpLocalToHLWorld), out ); |
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} |
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#if USE_VERT_CACHE |
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inline Vector CachedVertByIndex(int index) const |
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{ |
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int subIndex = index & 3; |
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return m_vertCache[index>>2].Vec(subIndex); |
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} |
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#endif |
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bool IsValid( void ) { return m_pLedge != NULL; } |
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void AllocateVisitHash() |
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{ |
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if ( !m_pVisitHash ) |
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m_pVisitHash = AllocVisitHash(); |
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} |
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void SetLedge( const IVP_Compact_Ledge *pLedge ) |
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{ |
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m_pLedge = pLedge; |
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m_pLeafmap = NULL; |
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if ( !pLedge ) |
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return; |
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#if USE_VERT_CACHE |
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m_cacheCount = 0; |
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#endif |
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if ( m_pCollideMap ) |
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{ |
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for ( int i = 0; i < m_pCollideMap->leafCount; i++ ) |
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{ |
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if ( m_pCollideMap->leafmap[i].pLeaf == pLedge ) |
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{ |
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m_pLeafmap = &m_pCollideMap->leafmap[i]; |
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if ( !BuildLeafmapCache( &m_pCollideMap->leafmap[i] ) ) |
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{ |
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AllocateVisitHash(); |
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} |
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return; |
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} |
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} |
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} |
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AllocateVisitHash(); |
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} |
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bool SetSingleConvex( void ) |
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{ |
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return false; |
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const IVP_Compact_Ledgetree_Node *node = m_pSurface->get_compact_ledge_tree_root(); |
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if ( node->is_terminal() == IVP_TRUE ) |
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{ |
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SetLedge( node->get_compact_ledge() ); |
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return true; |
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} |
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SetLedge( NULL ); |
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return false; |
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} |
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bool BuildLeafmapCache(const leafmap_t * RESTRICT pLeafmap); |
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bool BuildLeafmapCacheRLE( const leafmap_t * RESTRICT pLeafmap ); |
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inline int SupportMapCached( const Vector &dir, Vector *pOut ) const; |
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const collidemap_t *m_pCollideMap; |
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const IVP_Compact_Surface *m_pSurface; |
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private: |
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const leafmap_t *m_pLeafmap; |
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const IVP_Compact_Ledge *m_pLedge; |
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CVisitHash *m_pVisitHash; |
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#if SIMD_MATRIX |
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FourVectors m_ivpLocalToHLWorld; |
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#else |
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matrix3x4_t m_ivpLocalToHLWorld; |
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#endif |
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IVP_U_Matrix m_matrix; |
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// transform that includes scale from IVP to HL coords, do not VectorITransform or VectorRotate with this |
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float m_radius; |
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int m_nPointTest; |
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int m_nStartPoint; |
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bool m_bHasTranslation; |
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#if USE_VERT_CACHE |
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int m_cacheCount; // number of FourVectors used |
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FourVectors m_vertCache[BRUTE_FORCE_VERT_COUNT/4]; |
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#endif |
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}; |
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// GCC 4.2.1 can't handle loading a static const into a m128 register :( |
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#ifdef WIN32 |
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static const |
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#endif |
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fltx4 g_IVPToHLDir = { 1.0f, -1.0f, 1.0f, 1.0f }; |
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//static const fltx4 g_IVPToHLPosition = { IVP2HL(1.0f), -IVP2HL(1.0f), IVP2HL(1.0f), IVP2HL(1.0f) }; |
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#if defined(_X360) |
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FORCEINLINE fltx4 ConvertDirectionToIVP( const fltx4 & a ) |
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{ |
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fltx4 t = __vpermwi( a, VPERMWI_CONST( 0, 2, 1, 3 ) ); |
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// negate Y |
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return MulSIMD( t, g_IVPToHLDir ); |
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} |
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#else |
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FORCEINLINE fltx4 ConvertDirectionToIVP( const fltx4 & a ) |
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{ |
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// swap Z & Y |
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fltx4 t = _mm_shuffle_ps( a, a, MM_SHUFFLE_REV( 0, 2, 1, 3 ) ); |
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// negate Y |
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return MulSIMD( t, g_IVPToHLDir ); |
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} |
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#endif |
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CTraceIVP::CTraceIVP( const CPhysCollide *pCollide, const Vector &origin, const QAngle &angles ) |
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{ |
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return; |
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if( !pCollide ) |
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return; |
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#if USE_COLLIDE_MAP |
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m_pCollideMap = pCollide->GetCollideMap(); |
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#else |
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m_pCollideMap = NULL; |
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#endif |
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m_pSurface = pCollide->GetCompactSurface(); |
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m_pLedge = NULL; |
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m_pVisitHash = NULL; |
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m_bHasTranslation = (origin==vec3_origin) ? false : true; |
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// UNDONE: Move this offset calculation into the tracing routines |
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// I didn't do this now because it seems to require changes to most of the |
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// transform routines - and this would cause bugs. |
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float centerOffset = VectorLength( m_pSurface->mass_center.k ); |
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#if SIMD_MATRIX |
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VectorAligned forward, right, up; |
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IVP_U_Float_Point ivpForward, ivpLeft, ivpUp; |
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AngleVectors( angles, &forward, &right, &up ); |
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Vector left = -right; |
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Vector down = -up; |
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ConvertDirectionToIVP( forward, ivpForward ); |
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ConvertDirectionToIVP( left, ivpLeft ); |
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ConvertDirectionToIVP( down, ivpUp ); |
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m_matrix.set_col( IVP_INDEX_X, &ivpForward ); |
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m_matrix.set_col( IVP_INDEX_Z, &ivpLeft ); |
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m_matrix.set_col( IVP_INDEX_Y, &ivpUp ); |
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ConvertPositionToIVP( origin, m_matrix.vv ); |
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forward.w = HL2IVP(origin.x); |
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// This vector is supposed to be left, so we'll negate it later, but we don't want to |
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// negate the position, so add another minus to cancel out |
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right.w = -HL2IVP(origin.y); |
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up.w = HL2IVP(origin.z); |
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fltx4 rx = ConvertDirectionToIVP(LoadAlignedSIMD(forward.Base())); |
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fltx4 ry = ConvertDirectionToIVP(SubSIMD( Four_Zeros, LoadAlignedSIMD(right.Base())) ); |
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fltx4 rz = ConvertDirectionToIVP(LoadAlignedSIMD(up.Base()) ); |
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fltx4 scaleHL = ReplicateX4(IVP2HL(1.0f)); |
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m_ivpLocalToHLWorld.x = MulSIMD( scaleHL, rx ); |
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m_ivpLocalToHLWorld.y = MulSIMD( scaleHL, ry ); |
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m_ivpLocalToHLWorld.z = MulSIMD( scaleHL, rz ); |
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#else |
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ConvertRotationToIVP( angles, m_matrix ); |
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ConvertPositionToIVP( origin, m_matrix.vv ); |
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float scale = IVP2HL(1.0f); |
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float negScale = IVP2HL(-1.0f); |
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// copy the existing IVP local->world matrix (swap Y & Z) |
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m_ivpLocalToHLWorld.m_flMatVal[0][0] = m_matrix.get_elem(IVP_INDEX_X,0) * scale; |
|
m_ivpLocalToHLWorld.m_flMatVal[0][1] = m_matrix.get_elem(IVP_INDEX_X,1) * scale; |
|
m_ivpLocalToHLWorld.m_flMatVal[0][2] = m_matrix.get_elem(IVP_INDEX_X,2) * scale; |
|
|
|
m_ivpLocalToHLWorld.m_flMatVal[1][0] = m_matrix.get_elem(IVP_INDEX_Z,0) * scale; |
|
m_ivpLocalToHLWorld.m_flMatVal[1][1] = m_matrix.get_elem(IVP_INDEX_Z,1) * scale; |
|
m_ivpLocalToHLWorld.m_flMatVal[1][2] = m_matrix.get_elem(IVP_INDEX_Z,2) * scale; |
|
|
|
m_ivpLocalToHLWorld.m_flMatVal[2][0] = m_matrix.get_elem(IVP_INDEX_Y,0) * negScale; |
|
m_ivpLocalToHLWorld.m_flMatVal[2][1] = m_matrix.get_elem(IVP_INDEX_Y,1) * negScale; |
|
m_ivpLocalToHLWorld.m_flMatVal[2][2] = m_matrix.get_elem(IVP_INDEX_Y,2) * negScale; |
|
|
|
m_ivpLocalToHLWorld.m_flMatVal[0][3] = m_matrix.vv.k[0] * scale; |
|
m_ivpLocalToHLWorld.m_flMatVal[1][3] = m_matrix.vv.k[2] * scale; |
|
m_ivpLocalToHLWorld.m_flMatVal[2][3] = m_matrix.vv.k[1] * negScale; |
|
|
|
#endif |
|
|
|
m_radius = ConvertDistanceToHL( m_pSurface->upper_limit_radius + centerOffset ); |
|
} |
|
|
|
bool CTraceIVP::BuildLeafmapCacheRLE( const leafmap_t * RESTRICT pLeafmap ) |
|
{ |
|
// iterate the rle spans of verts and output them to a buffer in post-transform space |
|
int startPoint = pLeafmap->startVert[0]; |
|
int pointCount = pLeafmap->vertCount; |
|
m_cacheCount = (pointCount + 3)>>2; |
|
const byte *RESTRICT pSpans = pLeafmap->GetSpans(); |
|
int countThisSpan = pSpans[0]; |
|
int spanIndex = 1; |
|
int baseVert = 0; |
|
const VectorAligned * RESTRICT pVerts = (const VectorAligned *)&m_pLedge->get_point_array()[startPoint]; |
|
for ( int i = 0; i < m_cacheCount-1; i++ ) |
|
{ |
|
if ( countThisSpan < 4 ) |
|
{ |
|
// unrolled for perf |
|
// we need a batch of four verts, but they aren't in a single span |
|
int v0, v1, v2, v3; |
|
if ( !countThisSpan ) |
|
{ |
|
baseVert += pSpans[spanIndex]; |
|
countThisSpan = pSpans[spanIndex+1]; |
|
spanIndex += 2; |
|
} |
|
v0 = baseVert++; |
|
countThisSpan--; |
|
if ( !countThisSpan ) |
|
{ |
|
baseVert += pSpans[spanIndex]; |
|
countThisSpan = pSpans[spanIndex+1]; |
|
spanIndex += 2; |
|
} |
|
v1 = baseVert++; |
|
countThisSpan--; |
|
if ( !countThisSpan ) |
|
{ |
|
baseVert += pSpans[spanIndex]; |
|
countThisSpan = pSpans[spanIndex+1]; |
|
spanIndex += 2; |
|
} |
|
v2 = baseVert++; |
|
countThisSpan--; |
|
if ( !countThisSpan ) |
|
{ |
|
baseVert += pSpans[spanIndex]; |
|
countThisSpan = pSpans[spanIndex+1]; |
|
spanIndex += 2; |
|
} |
|
v3 = baseVert++; |
|
countThisSpan--; |
|
m_vertCache[i].LoadAndSwizzleAligned( pVerts[v0].Base(), pVerts[v1].Base(), pVerts[v2].Base(), pVerts[v3].Base() ); |
|
} |
|
else |
|
{ |
|
// we have four verts in this span, just grab the next four |
|
m_vertCache[i].LoadAndSwizzleAligned( pVerts[baseVert+0].Base(), pVerts[baseVert+1].Base(), pVerts[baseVert+2].Base(), pVerts[baseVert+3].Base() ); |
|
baseVert += 4; |
|
countThisSpan -= 4; |
|
} |
|
} |
|
// the last iteration needs multiple spans and clamping to the last vert |
|
int v[4]; |
|
for ( int i = 0; i < 4; i++ ) |
|
{ |
|
if ( spanIndex < pLeafmap->spanCount && !countThisSpan ) |
|
{ |
|
baseVert += pSpans[spanIndex]; |
|
countThisSpan = pSpans[spanIndex+1]; |
|
spanIndex += 2; |
|
} |
|
if ( spanIndex < pLeafmap->spanCount ) |
|
{ |
|
v[i] = baseVert; |
|
baseVert++; |
|
countThisSpan--; |
|
} |
|
else |
|
{ |
|
v[i] = baseVert; |
|
if ( countThisSpan > 1 ) |
|
{ |
|
countThisSpan--; |
|
baseVert++; |
|
} |
|
} |
|
} |
|
m_vertCache[m_cacheCount-1].LoadAndSwizzleAligned( pVerts[v[0]].Base(), pVerts[v[1]].Base(), pVerts[v[2]].Base(), pVerts[v[3]].Base() ); |
|
FourVectors::RotateManyBy( &m_vertCache[0], m_cacheCount, *((const matrix3x4_t *)&m_ivpLocalToHLWorld) ); |
|
|
|
return true; |
|
} |
|
|
|
bool CTraceIVP::BuildLeafmapCache( const leafmap_t * RESTRICT pLeafmap ) |
|
{ |
|
#if !USE_VERT_CACHE |
|
return false; |
|
#else |
|
if ( !pLeafmap || !pLeafmap->HasSpans() || m_bHasTranslation ) |
|
return false; |
|
if ( pLeafmap->HasRLESpans() ) |
|
{ |
|
return BuildLeafmapCacheRLE(pLeafmap); |
|
} |
|
|
|
// single vertex span, just xform + copy |
|
|
|
// iterate the span of verts and output them to a buffer in post-transform space |
|
// just iterate the range if one is specified |
|
int startPoint = pLeafmap->startVert[0]; |
|
int pointCount = pLeafmap->vertCount; |
|
m_cacheCount = (pointCount + 3)>>2; |
|
Assert(m_cacheCount>=0 && m_cacheCount<= (BRUTE_FORCE_VERT_COUNT/4)); |
|
|
|
const VectorAligned * RESTRICT pVerts = (const VectorAligned *)&m_pLedge->get_point_array()[startPoint]; |
|
for ( int i = 0; i < m_cacheCount-1; i++ ) |
|
{ |
|
m_vertCache[i].LoadAndSwizzleAligned( pVerts[0].Base(), pVerts[1].Base(), pVerts[2].Base(), pVerts[3].Base() ); |
|
pVerts += 4; |
|
} |
|
|
|
int remIndex = (pointCount-1) & 3; |
|
int x0 = 0; |
|
int x1 = min(1,remIndex); |
|
int x2 = min(2,remIndex); |
|
int x3 = min(3,remIndex); |
|
m_vertCache[m_cacheCount-1].LoadAndSwizzleAligned( pVerts[x0].Base(), pVerts[x1].Base(), pVerts[x2].Base(), pVerts[x3].Base() ); |
|
FourVectors::RotateManyBy( &m_vertCache[0], m_cacheCount, *((const matrix3x4_t *)&m_ivpLocalToHLWorld) ); |
|
return true; |
|
#endif |
|
} |
|
|
|
static const fltx4 g_IndexBase = {0,1,2,3}; |
|
int CTraceIVP::SupportMapCached( const Vector &dir, Vector *pOut ) const |
|
{ |
|
VPROF("SupportMapCached"); |
|
#if USE_VERT_CACHE |
|
FourVectors fourDir; |
|
#if defined(_X360) |
|
fltx4 vec = LoadUnaligned3SIMD( dir.Base() ); |
|
fourDir.x = SplatXSIMD(vec); |
|
fourDir.y = SplatYSIMD(vec); |
|
fourDir.z = SplatZSIMD(vec); |
|
#else |
|
fourDir.DuplicateVector(dir); |
|
#endif |
|
|
|
fltx4 index = g_IndexBase; |
|
fltx4 maxIndex = g_IndexBase; |
|
fltx4 maxDot = fourDir * m_vertCache[0]; |
|
for ( int i = 1; i < m_cacheCount; i++ ) |
|
{ |
|
index = AddSIMD(index, Four_Fours); |
|
fltx4 dot = fourDir * m_vertCache[i]; |
|
fltx4 cmpMask = CmpGtSIMD(dot,maxDot); |
|
maxIndex = MaskedAssign( cmpMask, index, maxIndex ); |
|
maxDot = MaxSIMD(dot, maxDot); |
|
} |
|
|
|
// find highest of 4 |
|
fltx4 rot = RotateLeft2(maxDot); |
|
fltx4 rotIndex = RotateLeft2(maxIndex); |
|
fltx4 cmpMask = CmpGtSIMD(rot,maxDot); |
|
maxIndex = MaskedAssign(cmpMask, rotIndex, maxIndex); |
|
maxDot = MaxSIMD(rot,maxDot); |
|
rotIndex = RotateLeft(maxIndex); |
|
rot = RotateLeft(maxDot); |
|
cmpMask = CmpGtSIMD(rot,maxDot); |
|
maxIndex = MaskedAssign(cmpMask, rotIndex, maxIndex); |
|
// not needed unless we need the actual max dot at the end |
|
// maxDot = MaxSIMD(rot,maxDot); |
|
|
|
int bestIndex = SubFloatConvertToInt(maxIndex,0); |
|
*pOut = CachedVertByIndex(bestIndex); |
|
|
|
return bestIndex; |
|
#else |
|
Assert(0); |
|
#endif |
|
} |
|
|
|
int CTraceIVP::SupportMap( const Vector &dir, Vector *pOut ) const |
|
{ |
|
#if USE_VERT_CACHE |
|
if ( m_cacheCount ) |
|
return SupportMapCached( dir, pOut ); |
|
#endif |
|
|
|
if ( m_pLeafmap && m_pLeafmap->HasSingleVertexSpan() ) |
|
{ |
|
VPROF("SupportMap_Leaf"); |
|
const IVP_U_Float_Point *pPoints = m_pLedge->get_point_array(); |
|
IVP_U_Float_Point mapdir; |
|
TransformDirectionToLocal( dir, mapdir ); |
|
// just iterate the range if one is specified |
|
int startPoint = m_pLeafmap->startVert[0]; |
|
int pointCount = m_pLeafmap->vertCount; |
|
float bestDot = pPoints[startPoint].dot_product(&mapdir); |
|
int best = startPoint; |
|
for ( int i = 1; i < pointCount; i++ ) |
|
{ |
|
float dot = pPoints[startPoint+i].dot_product(&mapdir); |
|
if ( dot > bestDot ) |
|
{ |
|
bestDot = dot; |
|
best = startPoint+i; |
|
} |
|
} |
|
|
|
TransformPositionFromLocal( pPoints[best], *pOut ); // transform point position to world space |
|
return best; |
|
} |
|
else |
|
{ |
|
VPROF("SupportMap_Walk"); |
|
const IVP_U_Float_Point *pPoints = m_pLedge->get_point_array(); |
|
IVP_U_Float_Point mapdir; |
|
TransformDirectionToLocal( dir, mapdir ); |
|
int triCount = m_pLedge->get_n_triangles(); |
|
Assert( m_pVisitHash ); |
|
m_pVisitHash->NewVisit(); |
|
|
|
float dot; |
|
int triIndex = 0, edgeIndex = 0; |
|
GetStartVert( m_pLeafmap, mapdir, triIndex, edgeIndex ); |
|
const IVP_Compact_Triangle *RESTRICT pTri = m_pLedge->get_first_triangle() + triIndex; |
|
const IVP_Compact_Edge *RESTRICT pEdge = pTri->get_edge( edgeIndex ); |
|
int best = pEdge->get_start_point_index(); |
|
float bestDot = pPoints[best].dot_product( &mapdir ); |
|
m_pVisitHash->VisitVert(best); |
|
|
|
// This should never happen. MAX_CONVEX_VERTS is very large (millions), none of our |
|
// models have anywhere near this many verts in a convex piece |
|
Assert(triCount*3<MAX_CONVEX_VERTS); |
|
// this loop will early out, but keep it from being infinite |
|
for ( int i = 0; i < triCount; i++ ) |
|
{ |
|
// get the index to the end vert of this edge (start vert on next edge) |
|
pEdge = pEdge->get_prev(); |
|
int stopVert = pEdge->get_start_point_index(); |
|
|
|
// loop through the verts that can be reached along edges from this vert |
|
// stop if you get back to the one you're starting on. |
|
int vert = stopVert; |
|
do |
|
{ |
|
if ( !m_pVisitHash->WasVisited(vert) ) |
|
{ |
|
// this lets us skip doing dot products on this vert |
|
m_pVisitHash->VisitVert(vert); |
|
dot = pPoints[vert].dot_product( &mapdir ); |
|
if ( dot > bestDot ) |
|
{ |
|
bestDot = dot; |
|
best = vert; |
|
break; |
|
} |
|
} |
|
// tri opposite next edge, same starting vert as next edge |
|
pEdge = pEdge->get_opposite()->get_prev(); |
|
vert = pEdge->get_start_point_index(); |
|
} while ( vert != stopVert ); |
|
|
|
// if you exhausted the possibilities for this vert, it must be the best vert |
|
if ( vert != best ) |
|
break; |
|
} |
|
|
|
// code to do the brute force method with no hill-climbing |
|
#if 0 |
|
for ( i = 0; i < triCount; i++ ) |
|
{ |
|
pTri = m_pLedge->get_first_triangle() + i; |
|
for ( int j = 0; j < 3; j++ ) |
|
{ |
|
pEdge = pTri->get_edge( j ); |
|
int test = pEdge->get_start_point_index(); |
|
dot = pPoints[test].dot_product( &mapdir ); |
|
if ( dot > bestDot ) |
|
{ |
|
Assert(0); // shouldn't hit this unless the hill-climb is broken |
|
bestDot = dot; |
|
best = test; |
|
} |
|
} |
|
} |
|
#endif |
|
TransformPositionFromLocal( pPoints[best], *pOut ); // transform point position to world space |
|
|
|
return best; |
|
} |
|
} |
|
|
|
Vector CTraceIVP::GetVertByIndex( int index ) const |
|
{ |
|
#if USE_VERT_CACHE |
|
if ( m_cacheCount ) |
|
{ |
|
return CachedVertByIndex(index); |
|
} |
|
#endif |
|
const IVP_Compact_Poly_Point *pPoints = m_pLedge->get_point_array(); |
|
|
|
Vector out; |
|
TransformPositionFromLocal( pPoints[index], out ); |
|
return out; |
|
} |
|
|
|
//----------------------------------------------------------------------------- |
|
// Purpose: Implementation for Trace against an AABB |
|
//----------------------------------------------------------------------------- |
|
class CTraceAABB : public ITraceObject |
|
{ |
|
public: |
|
CTraceAABB( const Vector &hlmins, const Vector &hlmaxs, bool isPoint ); |
|
virtual int SupportMap( const Vector &dir, Vector *pOut ) const; |
|
virtual Vector GetVertByIndex( int index ) const; |
|
virtual float Radius( void ) const { return m_radius; } |
|
|
|
private: |
|
float m_x[2]; |
|
float m_y[2]; |
|
float m_z[2]; |
|
float m_radius; |
|
bool m_empty; |
|
}; |
|
|
|
|
|
CTraceAABB::CTraceAABB( const Vector &hlmins, const Vector &hlmaxs, bool isPoint ) |
|
{ |
|
if ( isPoint ) |
|
{ |
|
m_x[0] = m_x[1] = 0; |
|
m_y[0] = m_y[1] = 0; |
|
m_z[0] = m_z[1] = 0; |
|
m_radius = 0; |
|
m_empty = true; |
|
} |
|
else |
|
{ |
|
m_x[0] = hlmaxs[0]; |
|
m_x[1] = hlmins[0]; |
|
m_y[0] = hlmaxs[1]; |
|
m_y[1] = hlmins[1]; |
|
m_z[0] = hlmaxs[2]; |
|
m_z[1] = hlmins[2]; |
|
m_radius = hlmaxs.Length(); |
|
m_empty = false; |
|
} |
|
} |
|
|
|
|
|
int CTraceAABB::SupportMap( const Vector &dir, Vector *pOut ) const |
|
{ |
|
Vector out; |
|
|
|
if ( m_empty ) |
|
{ |
|
pOut->Init(); |
|
return 0; |
|
} |
|
// index is formed by the 3-bit bitfield SzSySx (negative is 1, positive is 0) |
|
int x = ((*((unsigned int *)&dir.x)) & 0x80000000UL) >> 31; |
|
int y = ((*((unsigned int *)&dir.y)) & 0x80000000UL) >> 31; |
|
int z = ((*((unsigned int *)&dir.z)) & 0x80000000UL) >> 31; |
|
pOut->x = m_x[x]; |
|
pOut->y = m_y[y]; |
|
pOut->z = m_z[z]; |
|
return (z<<2) | (y<<1) | x; |
|
} |
|
|
|
Vector CTraceAABB::GetVertByIndex( int index ) const |
|
{ |
|
Vector out; |
|
out.x = m_x[(index&1)]; |
|
out.y = m_y[(index&2)>>1]; |
|
out.z = m_z[(index&4)>>2]; |
|
|
|
return out; |
|
} |
|
|
|
|
|
//----------------------------------------------------------------------------- |
|
// Purpose: Implementation for Trace against an IVP object |
|
//----------------------------------------------------------------------------- |
|
class CTraceRay |
|
{ |
|
public: |
|
CTraceRay( const Vector &hlstart, const Vector &hlend ); |
|
CTraceRay( const Ray_t &ray ); |
|
CTraceRay( const Ray_t &ray, const Vector &offset ); |
|
void Init( const Vector &hlstart, const Vector &delta ); |
|
int SupportMap( const Vector &dir, Vector *pOut ) const; |
|
Vector GetVertByIndex( int index ) const { return ( index ) ? m_end : m_start; } |
|
float Radius( void ) const { return m_length * 0.5f; } |
|
|
|
void Reset( float fraction ); |
|
|
|
Vector m_start; |
|
Vector m_end; |
|
Vector m_delta; |
|
Vector m_dir; |
|
|
|
float m_length; |
|
float m_baseLength; |
|
float m_ooBaseLength; |
|
float m_bestDist; |
|
}; |
|
CTraceRay::CTraceRay( const Vector &hlstart, const Vector &hlend ) |
|
{ |
|
Init(hlstart, hlend-hlstart); |
|
} |
|
|
|
void CTraceRay::Init( const Vector &hlstart, const Vector &delta ) |
|
{ |
|
m_start = hlstart; |
|
m_end = hlstart + delta; |
|
m_delta = delta; |
|
m_dir = delta; |
|
float len = DotProduct(delta, delta); |
|
// don't use fast/sse sqrt here we need the precision |
|
m_length = sqrt(len); |
|
m_ooBaseLength = 0.0f; |
|
if ( m_length > 0 ) |
|
{ |
|
m_ooBaseLength = 1.0f / m_length; |
|
m_dir *= m_ooBaseLength; |
|
} |
|
m_baseLength = m_length; |
|
m_bestDist = 0.f; |
|
} |
|
|
|
CTraceRay::CTraceRay( const Ray_t &ray ) |
|
{ |
|
Init( ray.m_Start, ray.m_Delta ); |
|
} |
|
|
|
CTraceRay::CTraceRay( const Ray_t &ray, const Vector &offset ) |
|
{ |
|
Vector start; |
|
VectorAdd( ray.m_Start, offset, start ); |
|
Init( start, ray.m_Delta ); |
|
} |
|
|
|
void CTraceRay::Reset( float fraction ) |
|
{ |
|
// recompute from base values for max precision |
|
m_length = m_baseLength * fraction; |
|
m_end = m_start + fraction * m_delta; |
|
m_bestDist = 0.f; |
|
} |
|
|
|
int CTraceRay::SupportMap( const Vector &dir, Vector *pOut ) const |
|
{ |
|
if ( DotProduct( dir, m_delta ) > 0 ) |
|
{ |
|
*pOut = m_end; |
|
return 1; |
|
} |
|
*pOut = m_start; |
|
return 0; |
|
} |
|
|
|
static char *map_nullname = "**empty**"; |
|
static csurface_t nullsurface = { map_nullname, 0 }; |
|
|
|
static void CM_ClearTrace( trace_t *trace ) |
|
{ |
|
memset( trace, 0, sizeof(*trace)); |
|
trace->fraction = 1.f; |
|
trace->fractionleftsolid = 0; |
|
trace->surface = nullsurface; |
|
} |
|
|
|
class CDefConvexInfo : public IConvexInfo |
|
{ |
|
public: |
|
IConvexInfo *GetPtr() { return this; } |
|
|
|
virtual unsigned int GetContents( int convexGameData ) { return CONTENTS_SOLID; } |
|
}; |
|
|
|
class CTraceSolver |
|
{ |
|
public: |
|
CTraceSolver( trace_t *ptr, ITraceObject *sweepobject, CTraceRay *ray, ITraceObject *obstacle, const Vector &axis ) |
|
{ |
|
m_pTotalTrace = ptr; |
|
m_sweepObject = sweepobject; |
|
m_sweepObjectRadius = m_sweepObject->Radius(); |
|
m_obstacle = obstacle; |
|
m_ray = ray; |
|
m_traceLength = 0; |
|
m_totalTraceLength = max( ray->m_baseLength, 1e-8f ); |
|
m_pointClosestToIntersection = axis; |
|
m_epsilon = g_PhysicsUnits.collisionSweepEpsilon; |
|
} |
|
|
|
bool SweepSingleConvex( void ); |
|
float SolveMeshIntersection( simplex_t &simplex ); |
|
float SolveMeshIntersection2D( simplex_t &simplex ); |
|
virtual void DoSweep( void ) |
|
{ |
|
SweepSingleConvex(); |
|
*m_pTotalTrace = m_trace; |
|
} |
|
|
|
|
|
void SetEpsilon( float epsilon ) |
|
{ |
|
m_epsilon = epsilon; |
|
} |
|
|
|
protected: |
|
trace_t m_trace; |
|
|
|
Vector m_pointClosestToIntersection; |
|
ITraceObject *m_sweepObject; |
|
ITraceObject *m_obstacle; |
|
CTraceRay *m_ray; |
|
trace_t *m_pTotalTrace; |
|
float m_traceLength; |
|
float m_totalTraceLength; |
|
float m_sweepObjectRadius; |
|
float m_epsilon; |
|
private: |
|
CTraceSolver( const CTraceSolver & ); |
|
}; |
|
|
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class CTraceSolverSweptObject : public CTraceSolver |
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{ |
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public: |
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CTraceSolverSweptObject( trace_t *ptr, ITraceObject *sweepobject, CTraceRay *ray, CTraceIVP *obstacle, const Vector &axis, unsigned int contentsMask, IConvexInfo *pConvexInfo ); |
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void InitOSRay( void ); |
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void SweepLedgeTree_r( const IVP_Compact_Ledgetree_Node *node ); |
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inline bool SweepHitsSphereOS( const IVP_U_Float_Point *sphereCenter, float radius ); |
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virtual void DoSweep( void ); |
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inline void SweepAgainstNode( const IVP_Compact_Ledgetree_Node *node ); |
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CTraceIVP *m_obstacleIVP; |
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IConvexInfo *m_pConvexInfo; |
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unsigned int m_contentsMask; |
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CDefConvexInfo m_fakeConvexInfo; |
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IVP_U_Float_Point m_rayCenterOS; |
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IVP_U_Float_Point m_rayStartOS; |
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IVP_U_Float_Point m_rayDirOS; |
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IVP_U_Float_Point m_rayDeltaOS; |
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float m_rayLengthOS; |
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private: |
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CTraceSolverSweptObject( const CTraceSolverSweptObject & ); // no implementation, quells compiler warning |
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}; |
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CTraceSolverSweptObject::CTraceSolverSweptObject( trace_t *ptr, ITraceObject *sweepobject, CTraceRay *ray, CTraceIVP *obstacle, const Vector &axis, unsigned int contentsMask, IConvexInfo *pConvexInfo ) |
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: CTraceSolver( ptr, sweepobject, ray, obstacle, axis ) |
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{ |
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m_obstacleIVP = obstacle; |
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m_contentsMask = contentsMask; |
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m_pConvexInfo = (pConvexInfo != NULL) ? pConvexInfo : m_fakeConvexInfo.GetPtr(); |
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} |
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bool CTraceSolverSweptObject::SweepHitsSphereOS( const IVP_U_Float_Point *sphereCenter, float radius ) |
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{ |
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// disable this to help find bugs |
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#if DEBUG_TEST_ALL_LEDGES |
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return true; |
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#endif |
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// the ray is actually a line-swept-sphere with sweep object's radius |
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IVP_U_Float_Point delta_vec; // quick check for ends of ray |
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delta_vec.subtract( sphereCenter, &m_rayCenterOS ); |
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radius += m_sweepObjectRadius; |
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// Is the sphere close enough to the ray at the center? |
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float qsphere_rad = radius * radius; |
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|
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// If this is a 0 length ray, then the conservative test is 100% accurate |
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if ( m_rayLengthOS > 0 ) |
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{ |
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// Calculate the perpendicular distance to the sphere |
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// The perpendicular forms a right triangle with the vector between the ray/sphere centers |
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// and the ray direction vector. Calculate the projection of the hypoteneuse along the perpendicular |
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IVP_U_Float_Point h; |
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h.inline_calc_cross_product(&m_rayDirOS, &delta_vec); |
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if( h.quad_length() < qsphere_rad ) |
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return true; |
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} |
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else |
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{ |
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float quad_center_dist = delta_vec.quad_length(); |
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if ( quad_center_dist < qsphere_rad ) |
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{ |
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return true; |
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} |
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// Could a ray in any direction away from the ray center intersect this sphere? |
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float qrad_sum = m_rayLengthOS * 0.5f + radius; |
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qrad_sum *= qrad_sum; |
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if ( quad_center_dist >= qrad_sum ) |
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{ |
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return false; |
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} |
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} |
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return false; |
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} |
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inline void CTraceSolverSweptObject::SweepAgainstNode(const IVP_Compact_Ledgetree_Node *node) |
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{ |
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const IVP_Compact_Ledge *ledge = node->get_compact_ledge(); |
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unsigned int ledgeContents = m_pConvexInfo->GetContents( ledge->get_client_data() ); |
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if (m_contentsMask & ledgeContents) |
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{ |
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m_obstacleIVP->SetLedge( ledge ); |
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if ( SweepSingleConvex() ) |
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{ |
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if ( m_traceLength < m_totalTraceLength ) |
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{ |
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m_pTotalTrace->plane.normal = m_trace.plane.normal; |
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m_pTotalTrace->startsolid = m_trace.startsolid; |
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m_pTotalTrace->allsolid = m_trace.allsolid; |
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m_totalTraceLength = m_traceLength; |
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m_pTotalTrace->fraction = m_traceLength * m_ray->m_ooBaseLength; |
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Assert(m_pTotalTrace->fraction >= 0 && m_pTotalTrace->fraction <= 1.0f); |
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#if !DEBUG_KEEP_FULL_RAY |
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// shrink the ray to the shortened length, but leave a buffer of collisionSweepEpsilon units |
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// at the end to make sure that precision doesn't make you miss something slightly closer |
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float testFraction = (m_traceLength + m_epsilon*2) * m_ray->m_ooBaseLength; |
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if ( testFraction < 1.0f ) |
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{ |
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m_ray->Reset( testFraction ); |
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// Update OS ray to limit tests |
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m_rayLengthOS = m_obstacleIVP->TransformLengthToLocal( m_ray->m_length ); |
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m_rayCenterOS.add_multiple( &m_rayStartOS, &m_rayDeltaOS, 0.5f * testFraction ); |
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} |
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#endif |
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m_pTotalTrace->contents = ledgeContents; |
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} |
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} |
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} |
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} |
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void CTraceSolverSweptObject::SweepLedgeTree_r( const IVP_Compact_Ledgetree_Node *node ) |
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{ |
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IVP_U_Float_Point center; |
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center.set(node->center.k); |
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if ( !SweepHitsSphereOS( ¢er, node->radius ) ) |
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return; |
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// fast path for single leaf collision models |
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if ( node->is_terminal() == IVP_TRUE ) |
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{ |
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SweepAgainstNode(node); |
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return; |
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} |
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// use an array to implement a simple stack |
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CUtlVectorFixedGrowable<const IVP_Compact_Ledgetree_Node *, 64> list; |
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// pull the last item in the array (top of stack) |
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// this is nearly a priority queue, but not actually, but it's cheaper (and faster in the benchmarks) |
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// this code is trying to visit the nodes closest to the ray start first - which helps performance |
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// since we're only interested in the first intersection of the swept object with the physcollide. |
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while ( 1 ) |
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{ |
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// don't use the temp storage unless you have to. |
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loop_without_store: |
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if ( node->is_terminal() == IVP_TRUE ) |
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{ |
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// leaf, do the test |
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SweepAgainstNode(node); |
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} |
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else |
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{ |
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// check node's children |
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const IVP_Compact_Ledgetree_Node *node0 = node->left_son(); |
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center.set(node0->center.k); |
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// if we don't insert, this is larger than any quad distance |
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float lastDist = 1e16f; |
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if ( SweepHitsSphereOS( ¢er, node0->radius ) ) |
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{ |
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lastDist = m_rayStartOS.quad_distance_to(¢er); |
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} |
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else |
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{ |
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node0 = NULL; |
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} |
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const IVP_Compact_Ledgetree_Node *node1 = node->right_son(); |
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center.set(node1->center.k); |
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if ( SweepHitsSphereOS( ¢er, node1->radius ) ) |
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{ |
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if ( node0 ) |
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{ |
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// can hit, push on stack |
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int index = list.AddToTail(); |
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float dist1 = m_rayStartOS.quad_distance_to(¢er); |
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if ( lastDist < dist1 ) |
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{ |
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node = node0; |
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list[index] = node1; |
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} |
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else |
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{ |
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node = node1; |
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list[index] = node0; |
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} |
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} |
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else |
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{ |
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node = node1; |
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} |
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goto loop_without_store; |
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} |
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if ( node0 ) |
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{ |
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node = node0; |
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goto loop_without_store; |
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} |
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} |
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int last = list.Count()-1; |
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if ( last < 0 ) |
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break; |
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node = list[last]; |
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list.FastRemove(last); |
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} |
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} |
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void CTraceSolverSweptObject::InitOSRay( void ) |
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{ |
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// transform ray into object space |
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m_rayLengthOS = m_obstacleIVP->TransformLengthToLocal( m_ray->m_length ); |
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m_obstacleIVP->TransformPositionToLocal( m_ray->m_start, m_rayStartOS ); |
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// no translation on matrix mult because this is a vector |
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m_obstacleIVP->RotateRelativePositionToLocal( m_ray->m_delta, m_rayDeltaOS ); |
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m_rayDirOS.set(&m_rayDeltaOS); |
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m_rayDirOS.normize(); |
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// add_multiple with 3 params assumes no initial value (should be set_add_multiple) |
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m_rayCenterOS.add_multiple( &m_rayStartOS, &m_rayDeltaOS, 0.5f ); |
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} |
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void CTraceSolverSweptObject::DoSweep( void ) |
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{ |
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VPROF("TraceSolver::DoSweep"); |
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InitOSRay(); |
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} |
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void CPhysicsTrace::SweepBoxIVP( const Vector &start, const Vector &end, const Vector &mins, const Vector &maxs, const CPhysCollide *pCollide, const Vector &surfaceOrigin, const QAngle &surfaceAngles, trace_t *ptr ) |
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{ |
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Ray_t ray; |
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ray.Init( start, end, mins, maxs ); |
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SweepBoxIVP( ray, MASK_ALL, NULL, pCollide, surfaceOrigin, surfaceAngles, ptr ); |
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} |
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void CPhysicsTrace::SweepBoxIVP( const Ray_t &raySrc, unsigned int contentsMask, IConvexInfo *pConvexInfo, const CPhysCollide *pCollide, const Vector &surfaceOrigin, const QAngle &surfaceAngles, trace_t *ptr ) |
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{ |
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CM_ClearTrace( ptr ); |
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CTraceAABB box( -raySrc.m_Extents, raySrc.m_Extents, raySrc.m_IsRay ); |
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CTraceIVP ivp( pCollide, vec3_origin, surfaceAngles ); |
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// offset the space of this sweep so that the surface is at the origin of the solution space |
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CTraceRay ray( raySrc, -surfaceOrigin ); |
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CTraceSolverSweptObject solver( ptr, &box, &ray, &ivp, ray.m_start, contentsMask, pConvexInfo ); |
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solver.DoSweep(); |
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VectorAdd( raySrc.m_Start, raySrc.m_StartOffset, ptr->startpos ); |
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VectorMA( ptr->startpos, ptr->fraction, raySrc.m_Delta, ptr->endpos ); |
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// The plane was shifted because we shifted everything over by surfaceOrigin, shift it back |
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if ( ptr->DidHit() ) |
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{ |
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ptr->plane.dist = DotProduct( ptr->endpos, ptr->plane.normal ); |
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} |
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} |
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void CPhysicsTrace::SweepIVP( const Vector &start, const Vector &end, const CPhysCollide *pSweptSurface, const QAngle &sweptAngles, const CPhysCollide *pSurface, const Vector &surfaceOrigin, const QAngle &surfaceAngles, trace_t *ptr ) |
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{ |
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CM_ClearTrace( ptr ); |
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CTraceIVP sweptObject( pSweptSurface, vec3_origin, sweptAngles ); |
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// offset the space of this sweep so that the surface is at the origin of the solution space |
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CTraceIVP ivp( pSurface, vec3_origin, surfaceAngles ); |
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CTraceRay ray( start - surfaceOrigin, end - surfaceOrigin ); |
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IVP_U_BigVector<IVP_Compact_Ledge> objectLedges(32); |
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IVP_Compact_Ledge_Solver::get_all_ledges( pSweptSurface->GetCompactSurface(), &objectLedges ); |
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for ( int i = objectLedges.len() - 1; i >= 0; --i ) |
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{ |
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trace_t tr; |
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CM_ClearTrace( &tr ); |
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sweptObject.SetLedge( objectLedges.element_at(i) ); |
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CTraceSolverSweptObject solver( &tr, &sweptObject, &ray, &ivp, start - surfaceOrigin, MASK_ALL, NULL ); |
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// UNDONE: Need just more than 0.25" tolerance here because the output position will be used by vphysics |
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// UNDONE: Really this should be the collision radius from the environment. |
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solver.SetEpsilon( g_PhysicsUnits.globalCollisionTolerance ); |
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solver.DoSweep(); |
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if ( tr.fraction < ptr->fraction ) |
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{ |
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*ptr = tr; |
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} |
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} |
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ptr->endpos = start*(1.f-ptr->fraction) + end * ptr->fraction; |
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if ( ptr->DidHit() ) |
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{ |
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ptr->plane.dist = DotProduct( ptr->endpos, ptr->plane.normal ); |
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} |
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} |
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static void CalculateSeparatingPlane( trace_t *ptr, ITraceObject *sweepObject, CTraceRay *ray, ITraceObject *obstacle, simplex_t &simplex ); |
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//----------------------------------------------------------------------------- |
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// What is this doing? It's going to be hard to understand without reading a |
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// reference on the GJK algorithm. But here's a quick overview: |
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// Basically (remember this is glossing over a ton of details!) the |
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// algorithm is building up a simplex that is trying to contain the origin. |
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// A simplex is a point, line segment, triangle, or tetrahedron - depending on |
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// how many verts you have. |
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// Anyway it slowly builds one of these one vert at a time with a directed search. |
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// So you start out with a point, then it guesses the next point that would be |
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// most likely to form a line through the origin. If the line doesn't go quite |
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// through the origin it tries to find a third point to capture the origin |
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// within a triangle. If that doesn't work it tries to make a |
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// tent (tetrahedron) out of the triangle to capture the origin. |
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// |
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// But at each step if the origin is not contained within, it tries to |
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// find which sub-feature is most likely to be in the solution. In |
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// the point case it's always just the point. In the line/edge case it |
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// can reduce back to a point (origin is closest to one of the points) |
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// or be the line (origin is closest to some point between them). |
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// Same with the triangle (origin is closest to one vert - vert, origin is |
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// closest to one edge - reduce to that edge, origin is closes to some point |
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// in the triangle's surface - keep the whole triangle). With a tetrahedron |
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// keeping the whole isn't possible unless the origin is inside and you're |
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// done (the origin has been captured). |
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// |
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// "You're done" means that there is an intersection between the two |
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// volumes. Assuming you're testing a sweep, it still has to test whether that |
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// sweep can be shrunk back until there is no intersection. So it checks that. |
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// If it's a swept test so it does the search with SolveMeshIntersection |
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// Otherwise, there's nothing to shrink, so you set startsolid and allsolid |
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// because it's a point/box in solid test, not a swept box/ray hits solid test. |
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// |
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// Why is it trying to capture the origin? Basically GJK sets up a space |
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// and a convex hull (the minkowski sum) in that space. The convex hull |
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// represents a field of the distances between different features of the pair |
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// of objects (e.g. for two circles, this minkowski sum is just a circle). |
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// So the origin is the point in the field where the distance between the |
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// objects is zero. This means they intersect. |
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//----------------------------------------------------------------------------- |
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#if defined(_X360) |
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inline void VectorNormalize_FastLowPrecision( Vector &a ) |
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{ |
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float quad = (a.x*a.x) + (a.y*a.y) + (a.z*a.z); |
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float ilen = __frsqrte(quad); |
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a.x *= ilen; |
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a.y *= ilen; |
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a.z *= ilen; |
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} |
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#else |
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#define VectorNormalize_FastLowPrecision VectorNormalize |
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#endif |
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bool CTraceSolver::SweepSingleConvex( void ) |
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{ |
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VPROF("TraceSolver::SweepSingleConvex"); |
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simplex_t simplex; |
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simplexvert_t vert; |
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Vector tmp; |
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simplex.vertCount = 0; |
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if ( m_pointClosestToIntersection == vec3_origin ) |
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{ |
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m_pointClosestToIntersection.Init(1,0,0); |
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} |
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float testLen = 1; |
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Vector dir = -m_pointClosestToIntersection; |
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VectorNormalize_FastLowPrecision(dir); |
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// safe loop, max 100 iterations |
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for ( int i = 0; i < 100; i++ ) |
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{ |
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// map the direction into the minkowski sum, get a new surface point |
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vert.testIndex = m_sweepObject->SupportMap( dir, &vert.position ); |
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vert.sweepIndex = m_ray->SupportMap( dir, &tmp ); |
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VectorAdd( vert.position, tmp, vert.position ); |
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vert.obstacleIndex = m_obstacle->SupportMap( -dir, &tmp ); |
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VectorSubtract( vert.position, tmp, vert.position ); |
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testLen = DotProduct( dir, vert.position ); |
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// found a separating axis, no intersection |
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if ( testLen < 0 ) |
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{ |
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VPROF("SolveSeparation"); |
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// make sure we're separated by at least m_epsilon |
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testLen = fabs(testLen); |
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if ( testLen < m_epsilon && m_ray->m_length > 0 ) |
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{ |
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// not separated by enough |
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Vector normal = dir; |
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if ( testLen > 0 ) |
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{ |
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// try to find a better separating plane or clip the ray to the current one |
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for ( int j = 0; j < 20; j++ ) |
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{ |
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Vector lastVert = vert.position; |
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simplex.SolveGJKSet( vert, &m_pointClosestToIntersection ); |
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dir = -m_pointClosestToIntersection; |
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VectorNormalize_FastLowPrecision( dir ); |
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// map the direction into the minkowski sum, get a new surface point |
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vert.testIndex = m_sweepObject->SupportMap( dir, &vert.position ); |
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vert.sweepIndex = m_ray->SupportMap( dir, &tmp ); |
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VectorAdd( vert.position, tmp, vert.position ); |
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vert.obstacleIndex = m_obstacle->SupportMap( -dir, &tmp ); |
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VectorSubtract( vert.position, tmp, vert.position ); |
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// found a separating axis, no intersection |
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float est = -DotProduct( dir, vert.position ); |
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if ( est > m_epsilon ) // big enough separation, no hit |
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return false; |
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// take plane with the most separation |
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if ( est > testLen ) |
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{ |
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testLen = est; |
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normal = dir; |
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} |
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float last = -DotProduct( dir, lastVert ); |
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// search is not converging, exit. |
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if ( (est - last) > -1e-4f ) |
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break; |
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} |
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} |
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// This trace is going to miss, but not by enough. |
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// Hit the separating plane instead |
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float dot = -DotProduct( m_ray->m_delta, normal ); |
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if ( dot < -(m_epsilon*0.1) || (dot < -1e-4f && testLen < (m_epsilon*0.9)) ) |
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{ |
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CM_ClearTrace( &m_trace ); |
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float backupDistance = m_epsilon - testLen; |
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backupDistance = -(backupDistance * m_ray->m_baseLength) / dot; |
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m_traceLength = m_ray->m_length - backupDistance; |
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if ( m_traceLength < 0 ) |
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{ |
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m_traceLength = 0; |
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// try sliding along the surface of the minkowski sum |
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backupDistance = SolveMeshIntersection2D( simplex ); |
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if ( m_ray->m_length > backupDistance ) |
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{ |
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m_traceLength = m_ray->m_length - backupDistance; |
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} |
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} |
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m_trace.plane.normal = -normal; |
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// this is fixed up by the outer code |
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//m_trace.endpos = m_ray->m_start*(1.f-m_trace.fraction) + m_ray->m_end*m_trace.fraction; |
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m_trace.contents = CONTENTS_SOLID; |
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return true; |
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} |
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} |
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return false; |
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} |
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|
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// contains the origin |
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if ( simplex.SolveGJKSet( vert, &m_pointClosestToIntersection ) ) |
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{ |
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VPROF("TraceSolver::SolveMeshIntersection"); |
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CM_ClearTrace( &m_trace ); |
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// now solve for t along the sweep |
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if ( m_ray->m_length != 0 ) |
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{ |
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float dist = SolveMeshIntersection( simplex ); |
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if ( dist < m_ray->m_length && dist > 0.f ) |
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{ |
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m_traceLength = (m_ray->m_length - dist); |
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CalculateSeparatingPlane( &m_trace, m_sweepObject, m_ray, m_obstacle, simplex ); |
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float dot = DotProduct( m_ray->m_dir, m_trace.plane.normal ); |
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if ( dot < 0 ) |
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{ |
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m_traceLength += (m_epsilon / dot); |
|
} |
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|
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if ( m_traceLength < 0 ) |
|
{ |
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m_traceLength = 0; |
|
} |
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//m_trace.fraction = m_traceLength * m_ray->m_ooBaseLength; |
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//m_trace.endpos = m_ray->m_start*(1.f-m_trace.fraction) + m_ray->m_end*m_trace.fraction; |
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m_trace.contents = CONTENTS_SOLID; |
|
} |
|
else |
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{ |
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// UNDONE: This case happens when you start solid as well as when a false |
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// intersection is detected at the very end of the trace |
|
m_trace.startsolid = true; |
|
m_trace.allsolid = true; |
|
m_traceLength = 0; |
|
} |
|
} |
|
else |
|
{ |
|
m_trace.startsolid = true; |
|
m_trace.allsolid = true; |
|
m_traceLength = 0; |
|
} |
|
return true; |
|
} |
|
dir = -m_pointClosestToIntersection; |
|
VectorNormalize_FastLowPrecision( dir ); |
|
} |
|
|
|
// BUGBUG: The solution never converged - something is probably wrong! |
|
AssertMsg( false, "Solution never converged."); |
|
return false; |
|
} |
|
|
|
|
|
// NEW SWEPT GJK SOLVER 2/16/2006 |
|
// convenience routines - just makes the code a little simpler. |
|
FORCEINLINE bool simplex_t::TriangleSimplex( const simplexvert_t &newPoint, int outIndex, const Vector &faceNormal, Vector *pOut ) |
|
{ |
|
vertCount = 3; |
|
verts[outIndex] = newPoint; |
|
*pOut = -faceNormal; |
|
return false; |
|
} |
|
FORCEINLINE bool simplex_t::EdgeSimplex( const simplexvert_t &newPoint, int outIndex, const Vector &edge, Vector *pOut ) |
|
{ |
|
vertCount = 2; |
|
verts[outIndex] = newPoint; |
|
Vector cross; |
|
CrossProduct( edge, newPoint.position, cross ); |
|
CrossProduct( cross, edge, *pOut ); |
|
return false; |
|
} |
|
|
|
FORCEINLINE bool simplex_t::PointSimplex( const simplexvert_t &newPoint, Vector *pOut ) |
|
{ |
|
vertCount = 1; |
|
verts[0] = newPoint; |
|
*pOut = newPoint.position; |
|
return false; |
|
} |
|
|
|
// In general the voronoi region routines have comments referring to the verts |
|
// All of the code assumes that vert A is the new vert being added to the set |
|
// verts B, C, D are the previous set. If BCD is a triangle it is assumed to be |
|
// counter-clockwise winding order. This must be maintained by the code! |
|
|
|
// parametric value for closes point on a line segment (p0->p1) to the origin. |
|
bool simplex_t::SolveVoronoiRegion2( const simplexvert_t &newPoint, Vector *pOut ) |
|
{ |
|
// solve the line segment AB (where A is the new point) |
|
Vector AB = verts[0].position - newPoint.position; |
|
float d = DotProduct(AB, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
return EdgeSimplex(newPoint, 1, AB, pOut); |
|
} |
|
else |
|
{ |
|
return PointSimplex(newPoint, pOut); |
|
} |
|
} |
|
|
|
// UNDONE: Collapse these routines into a single general routine? |
|
bool simplex_t::SolveVoronoiRegion3( const simplexvert_t &newPoint, Vector *pOut ) |
|
{ |
|
// solve the triangle ABC (where A is the new point) |
|
Vector AB = verts[0].position - newPoint.position; |
|
Vector AC = verts[1].position - newPoint.position; |
|
Vector ABC; |
|
CrossProduct(AB, AC, ABC); |
|
Vector ABCxAC; |
|
CrossProduct(ABC, AC, ABCxAC); |
|
float d = DotProduct(ABCxAC, newPoint.position); |
|
// edge AC or edgeAB / A? |
|
if ( d < 0 ) |
|
{ |
|
d = DotProduct(AC, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
// edge AC |
|
return EdgeSimplex(newPoint, 0, AC, pOut); |
|
} |
|
} |
|
else |
|
{ |
|
// face or A / edge AB? |
|
Vector ABxABC; |
|
CrossProduct(AB, ABC, ABxABC); |
|
d = DotProduct(ABxABC, newPoint.position); |
|
if ( d > 0 ) |
|
{ |
|
// closest to face |
|
vertCount = 3; |
|
d = DotProduct(ABC, newPoint.position); |
|
// in front of face, return opposite direction |
|
if ( d < 0 ) |
|
{ |
|
verts[2] = newPoint; |
|
*pOut = -ABC; |
|
return false; |
|
} |
|
verts[2] = verts[1]; // swap to keep CCW |
|
verts[1] = newPoint; |
|
*pOut = ABC; |
|
return false; |
|
} |
|
} |
|
// edge AB or A |
|
d = DotProduct(AB, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
return EdgeSimplex(newPoint, 1, AB, pOut); |
|
} |
|
return PointSimplex(newPoint, pOut); |
|
} |
|
|
|
bool simplex_t::SolveVoronoiRegion4( const simplexvert_t &newPoint, Vector *pOut ) |
|
{ |
|
// solve the tetrahedron ABCD (where A is the new point) |
|
|
|
// compute edge vectors |
|
Vector AB = verts[0].position - newPoint.position; |
|
Vector AC = verts[1].position - newPoint.position; |
|
Vector AD = verts[2].position - newPoint.position; |
|
|
|
// compute face normals |
|
Vector ABC, ACD, ADB; |
|
CrossProduct( AB, AC, ABC ); |
|
CrossProduct( AC, AD, ACD ); |
|
CrossProduct( AD, AB, ADB ); |
|
|
|
// edge plane normals |
|
Vector ABCxAC, ABxABC; |
|
CrossProduct( ABC, AC, ABCxAC ); |
|
CrossProduct( AB, ABC, ABxABC ); |
|
Vector ACDxAD, ACxACD; |
|
CrossProduct( ACD, AD, ACDxAD ); |
|
CrossProduct( AC, ACD, ACxACD ); |
|
Vector ADBxAB, ADxADB; |
|
CrossProduct( ADB, AB, ADBxAB ); |
|
CrossProduct( AD, ADB, ADxADB ); |
|
|
|
int faceFlags = 0; |
|
float d; |
|
d = DotProduct(ABC,newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
faceFlags |= 0x1; |
|
} |
|
d = DotProduct(ACD,newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
faceFlags |= 0x2; |
|
} |
|
d = DotProduct(ADB,newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
faceFlags |= 0x4; |
|
} |
|
|
|
switch( faceFlags ) |
|
{ |
|
case 0: |
|
// inside all 3 faces, we're done |
|
verts[3] = newPoint; |
|
vertCount = 4; |
|
return true; |
|
case 1: |
|
// ABC only, solve as a triangle |
|
return SolveVoronoiRegion3(newPoint, pOut); |
|
case 2: |
|
// ACD only, solve as a triangle |
|
verts[0] = verts[2]; // collapse BCD to DC |
|
return SolveVoronoiRegion3(newPoint, pOut); |
|
case 4: |
|
// ADB only, solve as a triangle |
|
verts[1] = verts[2]; // collapse BCD to BD |
|
return SolveVoronoiRegion3(newPoint, pOut); |
|
case 3: |
|
{ |
|
// in front of ABC & ACD |
|
d = DotProduct(ABCxAC, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
d = DotProduct(ACxACD, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
d = DotProduct(AC,newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
// edge AC |
|
return EdgeSimplex( newPoint, 0, AC, pOut); |
|
} |
|
// point A |
|
return PointSimplex(newPoint, pOut); |
|
} |
|
else |
|
{ |
|
d = DotProduct(ACDxAD, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
// edge AD |
|
verts[0] = verts[2]; // collapse BCD to D |
|
return EdgeSimplex(newPoint, 1, AD, pOut); |
|
} |
|
// face ACD |
|
return TriangleSimplex(newPoint,0,ACD, pOut); |
|
} |
|
} |
|
else |
|
{ |
|
d = DotProduct(ABxABC, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
d = DotProduct(AB, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
// edge AB |
|
return EdgeSimplex(newPoint, 1, AB, pOut); |
|
} |
|
return PointSimplex(newPoint, pOut); |
|
} |
|
return TriangleSimplex(newPoint,2,ABC,pOut); |
|
} |
|
} |
|
break; |
|
case 5: |
|
{ |
|
// in front of ADB & ABC |
|
d = DotProduct(ADBxAB, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
d = DotProduct(ABxABC, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
d = DotProduct(AB,newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
// edge AB |
|
return EdgeSimplex( newPoint, 1, AB , pOut); |
|
} |
|
// point A |
|
return PointSimplex(newPoint, pOut); |
|
} |
|
else |
|
{ |
|
d = DotProduct(ABCxAC, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
// edge AC |
|
return EdgeSimplex(newPoint, 0, AC, pOut); |
|
} |
|
// face ABC |
|
return TriangleSimplex(newPoint,2,ABC,pOut); |
|
} |
|
} |
|
else |
|
{ |
|
d = DotProduct(ADxADB, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
d = DotProduct(AD, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
// edge AD |
|
verts[0] = verts[2]; // collapse BCD to D |
|
return EdgeSimplex(newPoint, 1, AD, pOut); |
|
} |
|
return PointSimplex(newPoint, pOut); |
|
} |
|
return TriangleSimplex(newPoint,1,ADB,pOut); |
|
} |
|
} |
|
break; |
|
case 6: |
|
{ |
|
// in front of ACD & ADB |
|
d = DotProduct(ACDxAD, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
d = DotProduct(ADxADB, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
d = DotProduct(AD,newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
// edge AD |
|
verts[0] = verts[2]; // collapse BCD to D |
|
return EdgeSimplex(newPoint, 1, AD, pOut); |
|
} |
|
// point A |
|
return PointSimplex(newPoint, pOut); |
|
} |
|
else |
|
{ |
|
d = DotProduct(ADBxAB, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
// edge AB |
|
return EdgeSimplex(newPoint, 1, AB, pOut); |
|
} |
|
// face ADB |
|
return TriangleSimplex(newPoint,1,ADB, pOut); |
|
} |
|
} |
|
else |
|
{ |
|
d = DotProduct(ACxACD, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
d = DotProduct(AC, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
// edge AC |
|
return EdgeSimplex(newPoint, 0, AC, pOut); |
|
} |
|
return PointSimplex(newPoint, pOut); |
|
} |
|
return TriangleSimplex(newPoint,0,ACD, pOut); |
|
} |
|
} |
|
break; |
|
case 7: |
|
{ |
|
d = DotProduct(AB, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
return EdgeSimplex(newPoint, 1, AB, pOut); |
|
} |
|
else |
|
{ |
|
d = DotProduct(AC, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
return EdgeSimplex(newPoint, 0, AC, pOut); |
|
} |
|
else |
|
{ |
|
d = DotProduct(AD, newPoint.position); |
|
if ( d < 0 ) |
|
{ |
|
verts[0] = verts[2]; // collapse BCD to D |
|
return EdgeSimplex(newPoint, 1, AD, pOut); |
|
} |
|
return PointSimplex(newPoint, pOut); |
|
} |
|
} |
|
} |
|
} |
|
verts[3] = newPoint; |
|
vertCount = 4; |
|
return true; |
|
} |
|
|
|
|
|
bool simplex_t::SolveGJKSet( const simplexvert_t &w, Vector *pOut ) |
|
{ |
|
VPROF("TraceSolver::simplex::SolveGJKSet"); |
|
|
|
#if 0 |
|
for ( int v = 0; v < vertCount; v++ ) |
|
{ |
|
for ( int v2 = v+1; v2 < vertCount; v2++ ) |
|
{ |
|
if ( (verts[v].obstacleIndex == verts[v2].obstacleIndex) && |
|
(verts[v].sweepIndex == verts[v2].sweepIndex) && |
|
(verts[v].testIndex == verts[v2].testIndex) ) |
|
{ |
|
// same vert in the list twice! degenerate |
|
Assert(0); |
|
} |
|
} |
|
} |
|
#endif |
|
|
|
switch( vertCount ) |
|
{ |
|
case 0: |
|
vertCount = 1; |
|
verts[0] = w; |
|
*pOut = w.position; |
|
return false; |
|
case 1: |
|
return SolveVoronoiRegion2( w, pOut ); |
|
case 2: |
|
return SolveVoronoiRegion3( w, pOut ); |
|
case 3: |
|
return SolveVoronoiRegion4( w, pOut ); |
|
} |
|
|
|
return true; |
|
} |
|
|
|
|
|
void CalculateSeparatingPlane( trace_t *ptr, ITraceObject *sweepObject, CTraceRay *ray, ITraceObject *obstacle, simplex_t &simplex ) |
|
{ |
|
int testCount = 1, obstacleCount = 1; |
|
unsigned int testIndex[4], obstacleIndex[4]; |
|
testIndex[0] = simplex.verts[0].testIndex; |
|
obstacleIndex[0] = simplex.verts[0].obstacleIndex; |
|
Assert( simplex.vertCount <= 4 ); |
|
int i, j; |
|
for ( i = 1; i < simplex.vertCount; i++ ) |
|
{ |
|
for ( j = 0; j < obstacleCount; j++ ) |
|
{ |
|
if ( obstacleIndex[j] == simplex.verts[i].obstacleIndex ) |
|
break; |
|
} |
|
if ( j == obstacleCount ) |
|
{ |
|
obstacleIndex[obstacleCount++] = simplex.verts[i].obstacleIndex; |
|
} |
|
|
|
for ( j = 0; j < testCount; j++ ) |
|
{ |
|
if ( testIndex[j] == simplex.verts[i].testIndex ) |
|
break; |
|
} |
|
if ( j == testCount ) |
|
{ |
|
testIndex[testCount++] = simplex.verts[i].testIndex; |
|
} |
|
} |
|
|
|
if ( simplex.vertCount < 3 ) |
|
{ |
|
if ( simplex.vertCount == 2 && testCount == 2 ) |
|
{ |
|
// edge / point |
|
Vector t0 = sweepObject->GetVertByIndex( testIndex[0] ); |
|
Vector t1 = sweepObject->GetVertByIndex( testIndex[1] ); |
|
Vector edge = t1-t0; |
|
Vector tangent = CrossProduct( edge, ray->m_delta ); |
|
ptr->plane.normal = CrossProduct( edge, tangent ); |
|
VectorNormalize( ptr->plane.normal ); |
|
ptr->plane.dist = DotProduct( t0 + ptr->endpos, ptr->plane.normal ); |
|
return; |
|
} |
|
} |
|
if ( testCount == 3 ) |
|
{ |
|
// face / xxx |
|
Vector t0 = sweepObject->GetVertByIndex( testIndex[0] ); |
|
Vector t1 = sweepObject->GetVertByIndex( testIndex[1] ); |
|
Vector t2 = sweepObject->GetVertByIndex( testIndex[2] ); |
|
ptr->plane.normal = CrossProduct( t1-t0, t2-t0 ); |
|
VectorNormalize( ptr->plane.normal ); |
|
if ( DotProduct( ptr->plane.normal, ray->m_delta ) > 0 ) |
|
{ |
|
ptr->plane.normal = -ptr->plane.normal; |
|
} |
|
ptr->plane.dist = DotProduct( t0 + ptr->endpos, ptr->plane.normal ); |
|
} |
|
else if ( testCount == 2 && obstacleCount == 2 ) |
|
{ |
|
// edge / edge |
|
Vector t0 = sweepObject->GetVertByIndex( testIndex[0] ); |
|
Vector t1 = sweepObject->GetVertByIndex( testIndex[1] ); |
|
Vector t2 = obstacle->GetVertByIndex( obstacleIndex[0] ); |
|
Vector t3 = obstacle->GetVertByIndex( obstacleIndex[1] ); |
|
ptr->plane.normal = CrossProduct( t1-t0, t3-t2 ); |
|
VectorNormalize( ptr->plane.normal ); |
|
if ( DotProduct( ptr->plane.normal, ray->m_delta ) > 0 ) |
|
{ |
|
ptr->plane.normal = -ptr->plane.normal; |
|
} |
|
ptr->plane.dist = DotProduct( t0 + ptr->endpos, ptr->plane.normal ); |
|
} |
|
else if ( obstacleCount == 3 ) |
|
{ |
|
// xxx / face |
|
Vector t0 = obstacle->GetVertByIndex( obstacleIndex[0] ); |
|
Vector t1 = obstacle->GetVertByIndex( obstacleIndex[1] ); |
|
Vector t2 = obstacle->GetVertByIndex( obstacleIndex[2] ); |
|
ptr->plane.normal = CrossProduct( t1-t0, t2-t0 ); |
|
VectorNormalize( ptr->plane.normal ); |
|
if ( DotProduct( ptr->plane.normal, ray->m_delta ) > 0 ) |
|
{ |
|
ptr->plane.normal = -ptr->plane.normal; |
|
} |
|
ptr->plane.dist = DotProduct( t0, ptr->plane.normal ); |
|
} |
|
else |
|
{ |
|
ptr->plane.normal = -ray->m_dir; |
|
if ( simplex.vertCount ) |
|
{ |
|
ptr->plane.dist = DotProduct( ptr->plane.normal, obstacle->GetVertByIndex( simplex.verts[0].obstacleIndex ) ); |
|
} |
|
else |
|
ptr->plane.dist = 0.f; |
|
} |
|
} |
|
|
|
// clip a direction vector to a plane (ray begins at the origin) |
|
inline float Clip( const Vector &dir, const Vector &pos, const Vector &normal ) |
|
{ |
|
float dist = DotProduct(pos, normal); |
|
float cosTheta = DotProduct(dir,normal); |
|
if ( cosTheta > 0 ) |
|
return dist / cosTheta; |
|
|
|
// parallel or not facing the plane |
|
return 1e16f; |
|
} |
|
|
|
// This is the first iteration of solving time of intersection. |
|
// It needs to test all 4 faces of the tetrahedron to find the one the ray leaves through |
|
// this is done by finding the closest plane by clipping the ray to each plane |
|
Vector simplex_t::ClipRayToTetrahedronBase( const Vector &dir ) |
|
{ |
|
Vector AB = verts[0].position - verts[3].position; |
|
Vector AC = verts[1].position - verts[3].position; |
|
Vector AD = verts[2].position - verts[3].position; |
|
Vector BC = verts[1].position - verts[0].position; |
|
Vector BD = verts[2].position - verts[0].position; |
|
|
|
// compute face normals |
|
Vector ABC, ACD, ADB, BCD; |
|
CrossProduct( AB, AC, ABC ); |
|
CrossProduct( AC, AD, ACD ); |
|
CrossProduct( AD, AB, ADB ); |
|
CrossProduct( BD, BC, BCD ); // flipped to point out of the tetrahedron |
|
|
|
// NOTE: These cancel out in the clipping equation |
|
//VectorNormalize(ABC); |
|
//VectorNormalize(ACD); |
|
//VectorNormalize(ADB); |
|
//VectorNormalize(BCD); |
|
|
|
// Assert valid tetrahedron/winding order |
|
#if CHECK_TOI_CALCS |
|
Assert(DotProduct(verts[2].position, ABC) < DotProduct(verts[3].position, ABC )); |
|
Assert(DotProduct(verts[0].position, ACD) < DotProduct(verts[3].position, ACD )); |
|
Assert(DotProduct(verts[1].position, ADB) < DotProduct(verts[3].position, ADB )); |
|
Assert(DotProduct(verts[3].position, BCD) < DotProduct(verts[0].position, BCD )); |
|
#endif |
|
|
|
float dists[4]; |
|
dists[0] = Clip( dir, verts[3].position, ABC ); |
|
dists[1] = Clip( dir, verts[3].position, ACD ); |
|
dists[2] = Clip( dir, verts[3].position, ADB ); |
|
dists[3] = Clip( dir, verts[0].position, BCD ); |
|
float dmin = dists[3]; |
|
int best = 3; |
|
for ( int i = 0; i < 3; i++ ) |
|
{ |
|
if ( dists[i] < dmin ) |
|
{ |
|
best = i; |
|
dmin = dists[i]; |
|
} |
|
} |
|
|
|
vertCount = 3; |
|
// push back down to a triangle |
|
// Note that we need to preserve winding so that the vector order assumptions above are still valid! |
|
switch( best ) |
|
{ |
|
case 0: |
|
verts[2] = verts[3]; |
|
return ABC; |
|
case 1: |
|
verts[0] = verts[3]; |
|
return ACD; |
|
case 2: |
|
verts[1] = verts[3]; |
|
return ADB; |
|
case 3: |
|
// swap 1 & 2 |
|
verts[3] = verts[1]; |
|
verts[1] = verts[2]; |
|
verts[2] = verts[3]; |
|
return BCD; |
|
} |
|
Assert(0); // failed! |
|
return vec3_origin; |
|
} |
|
|
|
// for subsequent iterations you don't need to test one of the faces (face you previously left through) |
|
// so only test the three faces involving the new point A |
|
Vector simplex_t::ClipRayToTetrahedron( const Vector &dir ) |
|
{ |
|
Vector AB = verts[0].position - verts[3].position; |
|
Vector AC = verts[1].position - verts[3].position; |
|
Vector AD = verts[2].position - verts[3].position; |
|
|
|
// compute face normals |
|
Vector ABC, ACD, ADB; |
|
CrossProduct( AB, AC, ABC ); |
|
CrossProduct( AC, AD, ACD ); |
|
CrossProduct( AD, AB, ADB ); |
|
|
|
// NOTE: These cancel out in the clipping equation |
|
//VectorNormalize(ABC); |
|
//VectorNormalize(ACD); |
|
//VectorNormalize(ADB); |
|
|
|
// Assert valid tetrahedron/winding order |
|
#if CHECK_TOI_CALCS |
|
Assert(DotProduct(verts[2].position, ABC) < DotProduct(verts[3].position, ABC )); |
|
Assert(DotProduct(verts[0].position, ACD) < DotProduct(verts[3].position, ACD )); |
|
Assert(DotProduct(verts[1].position, ADB) < DotProduct(verts[3].position, ADB )); |
|
#endif |
|
|
|
float dists[3]; |
|
dists[0] = Clip( dir, verts[3].position, ABC ); |
|
dists[1] = Clip( dir, verts[3].position, ACD ); |
|
dists[2] = Clip( dir, verts[3].position, ADB ); |
|
|
|
float dmin = dists[2]; |
|
int best = 2; |
|
for ( int i = 0; i < 2; i++ ) |
|
{ |
|
if ( dists[i] < dmin ) |
|
{ |
|
best = i; |
|
dmin = dists[i]; |
|
} |
|
} |
|
|
|
vertCount = 3; |
|
// push back down to a triangle |
|
// Note that we need to preserve winding so that the vector order assumptions above are still valid! |
|
switch( best ) |
|
{ |
|
case 0: |
|
verts[2] = verts[3]; |
|
return ABC; |
|
case 1: |
|
verts[0] = verts[3]; |
|
return ACD; |
|
case 2: |
|
verts[1] = verts[3]; |
|
return ADB; |
|
} |
|
return vec3_origin; |
|
} |
|
|
|
float simplex_t::ClipRayToTriangle( const Vector &dir, float epsilon ) |
|
{ |
|
Vector AB = verts[0].position - verts[2].position; |
|
Vector AC = verts[1].position - verts[2].position; |
|
Vector BC = verts[1].position - verts[0].position; |
|
|
|
// compute face normal |
|
Vector ABC; |
|
CrossProduct( AB, AC, ABC ); // this points toward the origin |
|
VectorNormalize(ABC); |
|
Vector edgeAB, edgeAC, edgeBC; |
|
// these should point out of the triangle |
|
CrossProduct( AB, ABC, edgeAB ); |
|
CrossProduct( ABC, AC, edgeAC ); |
|
CrossProduct( BC, ABC, edgeBC ); |
|
|
|
// NOTE: These cancel out in the clipping equation |
|
VectorNormalize(edgeAB); |
|
VectorNormalize(edgeAC); |
|
VectorNormalize(edgeBC); |
|
|
|
#if CHECK_TOI_CALCS |
|
Assert(DotProduct(verts[2].position, ABC) < 0); // points toward |
|
// Assert valid triangle/winding order (all normals point away from the origin) |
|
Assert(DotProduct(verts[2].position, edgeAB) > 0); |
|
Assert(DotProduct(verts[2].position, edgeAC) > 0); |
|
Assert(DotProduct(verts[0].position, edgeBC) > 0); |
|
#endif |
|
|
|
float dists[3]; |
|
dists[0] = Clip( dir, verts[0].position, edgeAB ); |
|
dists[1] = Clip( dir, verts[1].position, edgeAC ); |
|
dists[2] = Clip( dir, verts[1].position, edgeBC ); |
|
Vector *normals[3] = {&edgeAB, &edgeAC, &edgeBC}; |
|
|
|
float dmin = dists[0]; |
|
int best = 0; |
|
if ( dists[1] < dmin ) |
|
{ |
|
dmin = dists[1]; |
|
best = 1; |
|
} |
|
if ( dists[2] < dmin ) |
|
{ |
|
best = 2; |
|
dmin = dists[2]; |
|
} |
|
float dot = DotProduct( dir, *normals[best] ); |
|
if ( dot <= 0 ) |
|
return 1e16f; |
|
dmin += epsilon/dot; |
|
|
|
return dmin; |
|
} |
|
|
|
// Solve for time of intersection along the sweep |
|
// Do this by iteratively clipping the ray to the tetrahedron containing the origin |
|
// when a triangle is found intersecting the ray, reduce the simplex to that triangle |
|
// and then re-expand it to a tetrahedron using the support point normal to the triangle (away from the origin) |
|
// iterate until no new points can be found. That's the surface of the sum. |
|
float CTraceSolver::SolveMeshIntersection( simplex_t &simplex ) |
|
{ |
|
Vector tmp; |
|
Assert( simplex.vertCount == 4 ); |
|
if ( simplex.vertCount < 4 ) |
|
return 0.0f; |
|
|
|
Vector v = simplex.ClipRayToTetrahedronBase( m_ray->m_dir ); |
|
|
|
simplexvert_t vert; |
|
// safe loop, max 100 iterations |
|
for ( int i = 0; i < 100; i++ ) |
|
{ |
|
VectorNormalize(v); |
|
vert.testIndex = m_sweepObject->SupportMap( v, &vert.position ); |
|
vert.sweepIndex = m_ray->SupportMap( v, &tmp ); |
|
VectorAdd( vert.position, tmp, vert.position ); |
|
vert.obstacleIndex = m_obstacle->SupportMap( -v, &tmp ); |
|
VectorSubtract( vert.position, tmp, vert.position ); |
|
|
|
// map the new separating axis (NOTE: This test is inverted from the GJK - we are trying to get out, not in) |
|
// found a separating axis, we've moved the sweep back enough |
|
float dist = DotProduct( v, simplex.verts[0].position ) + TEST_EPSILON; |
|
if ( DotProduct( v, vert.position ) <= dist ) |
|
{ |
|
Vector BC = simplex.verts[1].position - simplex.verts[0].position; |
|
Vector BD = simplex.verts[2].position - simplex.verts[0].position; |
|
|
|
// compute face normals |
|
Vector BCD; |
|
CrossProduct( BC, BD, BCD ); |
|
// NOTE: This cancels out inside Clip() |
|
//VectorNormalize( BCD ); |
|
// clip ray to triangle |
|
return Clip( m_ray->m_dir, simplex.verts[0].position, BCD ); |
|
} |
|
|
|
// add the new vert |
|
simplex.verts[simplex.vertCount] = vert; |
|
simplex.vertCount++; |
|
v = simplex.ClipRayToTetrahedron( m_ray->m_dir ); |
|
} |
|
|
|
Assert(0); |
|
return 0.0f; |
|
} |
|
|
|
// similar to SolveMeshIntersection, but solves projected into the 2D triangle simplex remaining |
|
// this is used for the near miss case |
|
float CTraceSolver::SolveMeshIntersection2D( simplex_t &simplex ) |
|
{ |
|
AssertMsg( simplex.vertCount == 3, "simplex.vertCount != 3: %d", simplex.vertCount ); |
|
if ( simplex.vertCount != 3 ) |
|
return 0.0f; |
|
|
|
// note: This should really do this iteratively in case the triangle is coplanar with another triangle that |
|
// is between this one and the edge of the sum in this plane |
|
float dist = simplex.ClipRayToTriangle( m_ray->m_dir, m_epsilon ); |
|
return dist; |
|
} |
|
|
|
|
|
static const Vector g_xpos(1,0,0), g_xneg(-1,0,0); |
|
static const Vector g_ypos(0,1,0), g_yneg(0,-1,0); |
|
static const Vector g_zpos(0,0,1), g_zneg(0,0,-1); |
|
|
|
void TraceGetAABB_r( Vector *pMins, Vector *pMaxs, const IVP_Compact_Ledgetree_Node *node, CTraceIVP &ivp ) |
|
{ |
|
if ( node->is_terminal() == IVP_TRUE ) |
|
{ |
|
Vector tmp; |
|
ivp.SetLedge( node->get_compact_ledge() ); |
|
ivp.SupportMap( g_xneg, &tmp ); |
|
AddPointToBounds( tmp, *pMins, *pMaxs ); |
|
ivp.SupportMap( g_yneg, &tmp ); |
|
AddPointToBounds( tmp, *pMins, *pMaxs ); |
|
ivp.SupportMap( g_zneg, &tmp ); |
|
AddPointToBounds( tmp, *pMins, *pMaxs ); |
|
ivp.SupportMap( g_xpos, &tmp ); |
|
AddPointToBounds( tmp, *pMins, *pMaxs ); |
|
ivp.SupportMap( g_ypos, &tmp ); |
|
AddPointToBounds( tmp, *pMins, *pMaxs ); |
|
ivp.SupportMap( g_zpos, &tmp ); |
|
AddPointToBounds( tmp, *pMins, *pMaxs ); |
|
return; |
|
} |
|
|
|
TraceGetAABB_r( pMins, pMaxs, node->left_son(), ivp ); |
|
TraceGetAABB_r( pMins, pMaxs, node->right_son(), ivp ); |
|
} |
|
|
|
void CPhysicsTrace::GetAABB( Vector *pMins, Vector *pMaxs, const CPhysCollide *pCollide, const Vector &collideOrigin, const QAngle &collideAngles ) |
|
{ |
|
return; |
|
|
|
CTraceIVP ivp( pCollide, collideOrigin, collideAngles ); |
|
|
|
if ( ivp.SetSingleConvex() ) |
|
{ |
|
Vector tmp; |
|
ivp.SupportMap( g_xneg, &tmp ); |
|
pMins->x = tmp.x; |
|
ivp.SupportMap( g_yneg, &tmp ); |
|
pMins->y = tmp.y; |
|
ivp.SupportMap( g_zneg, &tmp ); |
|
pMins->z = tmp.z; |
|
|
|
ivp.SupportMap( g_xpos, &tmp ); |
|
pMaxs->x = tmp.x; |
|
ivp.SupportMap( g_ypos, &tmp ); |
|
pMaxs->y = tmp.y; |
|
ivp.SupportMap( g_zpos, &tmp ); |
|
pMaxs->z = tmp.z; |
|
} |
|
else |
|
{ |
|
const IVP_Compact_Ledgetree_Node *lt_node_root; |
|
lt_node_root = pCollide->GetCompactSurface()->get_compact_ledge_tree_root(); |
|
ClearBounds( *pMins, *pMaxs ); |
|
TraceGetAABB_r( pMins, pMaxs, lt_node_root, ivp ); |
|
} |
|
// JAY: Disable this here, do it in the engine instead. That way the tools get |
|
// accurate bboxes |
|
#if 0 |
|
const float radius = g_PhysicsUnits.collisionSweepEpsilon; |
|
mins -= Vector(radius,radius,radius); |
|
maxs += Vector(radius,radius,radius); |
|
#endif |
|
} |
|
|
|
void TraceGetExtent_r( const IVP_Compact_Ledgetree_Node *node, CTraceIVP &ivp, const Vector &dir, float &dot, Vector &point ) |
|
{ |
|
if ( node->is_terminal() == IVP_TRUE ) |
|
{ |
|
ivp.SetLedge( node->get_compact_ledge() ); |
|
Vector tmp; |
|
ivp.SupportMap( dir, &tmp ); |
|
float newDot = DotProduct( tmp, dir ); |
|
|
|
if ( newDot > dot ) |
|
{ |
|
dot = newDot; |
|
point = tmp; |
|
} |
|
return; |
|
} |
|
|
|
TraceGetExtent_r( node->left_son(), ivp, dir, dot, point ); |
|
TraceGetExtent_r( node->right_son(), ivp, dir, dot, point ); |
|
} |
|
|
|
|
|
Vector CPhysicsTrace::GetExtent( const CPhysCollide *pCollide, const Vector &collideOrigin, const QAngle &collideAngles, const Vector &direction ) |
|
{ |
|
CTraceIVP ivp( pCollide, collideOrigin, collideAngles ); |
|
|
|
if ( ivp.SetSingleConvex() ) |
|
{ |
|
Vector tmp; |
|
ivp.SupportMap( direction, &tmp ); |
|
return tmp; |
|
} |
|
else |
|
{ |
|
const IVP_Compact_Ledgetree_Node *lt_node_root; |
|
lt_node_root = pCollide->GetCompactSurface()->get_compact_ledge_tree_root(); |
|
Vector out = vec3_origin; |
|
float tmp = -1e6f; |
|
TraceGetExtent_r( lt_node_root, ivp, direction, tmp, out ); |
|
return out; |
|
} |
|
} |
|
|
|
bool CPhysicsTrace::IsBoxIntersectingCone( const Vector &boxAbsMins, const Vector &boxAbsMaxs, const truncatedcone_t &cone ) |
|
{ |
|
trace_t tr; |
|
CM_ClearTrace( &tr ); |
|
bool bPoint = (boxAbsMins == boxAbsMaxs) ? true : false; |
|
CTraceAABB box( boxAbsMins - cone.origin, boxAbsMaxs - cone.origin, bPoint ); |
|
CTraceCone traceCone( cone, -cone.origin ); |
|
|
|
// offset the space of this sweep so that the surface is at the origin of the solution space |
|
CTraceRay ray( vec3_origin, vec3_origin ); |
|
|
|
CTraceSolver solver( &tr, &box, &ray, &traceCone, boxAbsMaxs ); |
|
solver.DoSweep(); |
|
|
|
return tr.startsolid; |
|
} |
|
|
|
|
|
|
|
CPhysicsTrace::CPhysicsTrace() |
|
{ |
|
} |
|
|
|
CPhysicsTrace::~CPhysicsTrace() |
|
{ |
|
} |
|
|
|
CVisitHash::CVisitHash() |
|
{ |
|
m_vertVisitID = 1; |
|
memset( m_vertVisit, 0, sizeof(m_vertVisit) ); |
|
}
|
|
|