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215 lines
5.1 KiB
215 lines
5.1 KiB
#ifndef CRYPTOPP_XTR_H |
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#define CRYPTOPP_XTR_H |
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/** \file |
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"The XTR public key system" by Arjen K. Lenstra and Eric R. Verheul |
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*/ |
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#include "modarith.h" |
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NAMESPACE_BEGIN(CryptoPP) |
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//! an element of GF(p^2) |
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class GFP2Element |
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{ |
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public: |
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GFP2Element() {} |
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GFP2Element(const Integer &c1, const Integer &c2) : c1(c1), c2(c2) {} |
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GFP2Element(const byte *encodedElement, unsigned int size) |
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: c1(encodedElement, size/2), c2(encodedElement+size/2, size/2) {} |
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void Encode(byte *encodedElement, unsigned int size) |
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{ |
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c1.Encode(encodedElement, size/2); |
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c2.Encode(encodedElement+size/2, size/2); |
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} |
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bool operator==(const GFP2Element &rhs) const {return c1 == rhs.c1 && c2 == rhs.c2;} |
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bool operator!=(const GFP2Element &rhs) const {return !operator==(rhs);} |
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void swap(GFP2Element &a) |
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{ |
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c1.swap(a.c1); |
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c2.swap(a.c2); |
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} |
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static const GFP2Element & Zero(); |
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Integer c1, c2; |
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}; |
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//! GF(p^2), optimal normal basis |
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template <class F> |
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class GFP2_ONB : public AbstractRing<GFP2Element> |
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{ |
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public: |
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typedef F BaseField; |
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GFP2_ONB(const Integer &p) : modp(p) |
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{ |
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if (p%3 != 2) |
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throw InvalidArgument("GFP2_ONB: modulus must be equivalent to 2 mod 3"); |
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} |
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const Integer& GetModulus() const {return modp.GetModulus();} |
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GFP2Element ConvertIn(const Integer &a) const |
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{ |
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t = modp.Inverse(modp.ConvertIn(a)); |
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return GFP2Element(t, t); |
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} |
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GFP2Element ConvertIn(const GFP2Element &a) const |
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{return GFP2Element(modp.ConvertIn(a.c1), modp.ConvertIn(a.c2));} |
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GFP2Element ConvertOut(const GFP2Element &a) const |
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{return GFP2Element(modp.ConvertOut(a.c1), modp.ConvertOut(a.c2));} |
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bool Equal(const GFP2Element &a, const GFP2Element &b) const |
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{ |
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return modp.Equal(a.c1, b.c1) && modp.Equal(a.c2, b.c2); |
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} |
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const Element& Identity() const |
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{ |
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return GFP2Element::Zero(); |
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} |
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const Element& Add(const Element &a, const Element &b) const |
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{ |
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result.c1 = modp.Add(a.c1, b.c1); |
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result.c2 = modp.Add(a.c2, b.c2); |
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return result; |
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} |
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const Element& Inverse(const Element &a) const |
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{ |
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result.c1 = modp.Inverse(a.c1); |
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result.c2 = modp.Inverse(a.c2); |
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return result; |
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} |
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const Element& Double(const Element &a) const |
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{ |
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result.c1 = modp.Double(a.c1); |
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result.c2 = modp.Double(a.c2); |
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return result; |
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} |
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const Element& Subtract(const Element &a, const Element &b) const |
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{ |
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result.c1 = modp.Subtract(a.c1, b.c1); |
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result.c2 = modp.Subtract(a.c2, b.c2); |
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return result; |
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} |
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Element& Accumulate(Element &a, const Element &b) const |
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{ |
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modp.Accumulate(a.c1, b.c1); |
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modp.Accumulate(a.c2, b.c2); |
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return a; |
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} |
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Element& Reduce(Element &a, const Element &b) const |
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{ |
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modp.Reduce(a.c1, b.c1); |
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modp.Reduce(a.c2, b.c2); |
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return a; |
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} |
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bool IsUnit(const Element &a) const |
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{ |
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return a.c1.NotZero() || a.c2.NotZero(); |
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} |
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const Element& MultiplicativeIdentity() const |
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{ |
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result.c1 = result.c2 = modp.Inverse(modp.MultiplicativeIdentity()); |
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return result; |
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} |
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const Element& Multiply(const Element &a, const Element &b) const |
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{ |
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t = modp.Add(a.c1, a.c2); |
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t = modp.Multiply(t, modp.Add(b.c1, b.c2)); |
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result.c1 = modp.Multiply(a.c1, b.c1); |
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result.c2 = modp.Multiply(a.c2, b.c2); |
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result.c1.swap(result.c2); |
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modp.Reduce(t, result.c1); |
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modp.Reduce(t, result.c2); |
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modp.Reduce(result.c1, t); |
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modp.Reduce(result.c2, t); |
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return result; |
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} |
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const Element& MultiplicativeInverse(const Element &a) const |
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{ |
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return result = Exponentiate(a, modp.GetModulus()-2); |
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} |
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const Element& Square(const Element &a) const |
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{ |
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const Integer &ac1 = (&a == &result) ? (t = a.c1) : a.c1; |
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result.c1 = modp.Multiply(modp.Subtract(modp.Subtract(a.c2, a.c1), a.c1), a.c2); |
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result.c2 = modp.Multiply(modp.Subtract(modp.Subtract(ac1, a.c2), a.c2), ac1); |
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return result; |
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} |
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Element Exponentiate(const Element &a, const Integer &e) const |
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{ |
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Integer edivp, emodp; |
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Integer::Divide(emodp, edivp, e, modp.GetModulus()); |
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Element b = PthPower(a); |
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return AbstractRing<GFP2Element>::CascadeExponentiate(a, emodp, b, edivp); |
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} |
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const Element & PthPower(const Element &a) const |
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{ |
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result = a; |
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result.c1.swap(result.c2); |
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return result; |
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} |
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void RaiseToPthPower(Element &a) const |
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{ |
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a.c1.swap(a.c2); |
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} |
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// a^2 - 2a^p |
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const Element & SpecialOperation1(const Element &a) const |
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{ |
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assert(&a != &result); |
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result = Square(a); |
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modp.Reduce(result.c1, a.c2); |
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modp.Reduce(result.c1, a.c2); |
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modp.Reduce(result.c2, a.c1); |
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modp.Reduce(result.c2, a.c1); |
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return result; |
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} |
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// x * z - y * z^p |
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const Element & SpecialOperation2(const Element &x, const Element &y, const Element &z) const |
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{ |
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assert(&x != &result && &y != &result && &z != &result); |
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t = modp.Add(x.c2, y.c2); |
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result.c1 = modp.Multiply(z.c1, modp.Subtract(y.c1, t)); |
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modp.Accumulate(result.c1, modp.Multiply(z.c2, modp.Subtract(t, x.c1))); |
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t = modp.Add(x.c1, y.c1); |
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result.c2 = modp.Multiply(z.c2, modp.Subtract(y.c2, t)); |
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modp.Accumulate(result.c2, modp.Multiply(z.c1, modp.Subtract(t, x.c2))); |
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return result; |
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} |
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protected: |
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BaseField modp; |
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mutable GFP2Element result; |
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mutable Integer t; |
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}; |
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void XTR_FindPrimesAndGenerator(RandomNumberGenerator &rng, Integer &p, Integer &q, GFP2Element &g, unsigned int pbits, unsigned int qbits); |
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GFP2Element XTR_Exponentiate(const GFP2Element &b, const Integer &e, const Integer &p); |
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NAMESPACE_END |
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#endif
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