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304 lines
8.6 KiB
304 lines
8.6 KiB
// rsa.cpp - written and placed in the public domain by Wei Dai |
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#include "pch.h" |
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#include "rsa.h" |
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#include "asn.h" |
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#include "oids.h" |
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#include "modarith.h" |
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#include "nbtheory.h" |
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#include "sha.h" |
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#include "algparam.h" |
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#include "fips140.h" |
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#if !defined(NDEBUG) && !defined(CRYPTOPP_IS_DLL) |
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#include "pssr.h" |
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NAMESPACE_BEGIN(CryptoPP) |
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void RSA_TestInstantiations() |
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{ |
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RSASS<PKCS1v15, SHA>::Verifier x1(1, 1); |
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RSASS<PKCS1v15, SHA>::Signer x2(NullRNG(), 1); |
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RSASS<PKCS1v15, SHA>::Verifier x3(x2); |
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RSASS<PKCS1v15, SHA>::Verifier x4(x2.GetKey()); |
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RSASS<PSS, SHA>::Verifier x5(x3); |
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#ifndef __MWERKS__ |
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RSASS<PSSR, SHA>::Signer x6 = x2; |
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x3 = x2; |
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x6 = x2; |
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#endif |
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RSAES<PKCS1v15>::Encryptor x7(x2); |
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#ifndef __GNUC__ |
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RSAES<PKCS1v15>::Encryptor x8(x3); |
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#endif |
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RSAES<OAEP<SHA> >::Encryptor x9(x2); |
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x4 = x2.GetKey(); |
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} |
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NAMESPACE_END |
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#endif |
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#ifndef CRYPTOPP_IMPORTS |
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NAMESPACE_BEGIN(CryptoPP) |
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OID RSAFunction::GetAlgorithmID() const |
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{ |
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return ASN1::rsaEncryption(); |
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} |
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void RSAFunction::BERDecodePublicKey(BufferedTransformation &bt, bool, size_t) |
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{ |
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BERSequenceDecoder seq(bt); |
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m_n.BERDecode(seq); |
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m_e.BERDecode(seq); |
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seq.MessageEnd(); |
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} |
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void RSAFunction::DEREncodePublicKey(BufferedTransformation &bt) const |
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{ |
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DERSequenceEncoder seq(bt); |
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m_n.DEREncode(seq); |
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m_e.DEREncode(seq); |
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seq.MessageEnd(); |
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} |
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Integer RSAFunction::ApplyFunction(const Integer &x) const |
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{ |
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DoQuickSanityCheck(); |
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return a_exp_b_mod_c(x, m_e, m_n); |
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} |
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bool RSAFunction::Validate(RandomNumberGenerator &rng, unsigned int level) const |
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{ |
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bool pass = true; |
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pass = pass && m_n > Integer::One() && m_n.IsOdd(); |
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pass = pass && m_e > Integer::One() && m_e.IsOdd() && m_e < m_n; |
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return pass; |
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} |
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bool RSAFunction::GetVoidValue(const char *name, const std::type_info &valueType, void *pValue) const |
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{ |
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return GetValueHelper(this, name, valueType, pValue).Assignable() |
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CRYPTOPP_GET_FUNCTION_ENTRY(Modulus) |
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CRYPTOPP_GET_FUNCTION_ENTRY(PublicExponent) |
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; |
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} |
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void RSAFunction::AssignFrom(const NameValuePairs &source) |
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{ |
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AssignFromHelper(this, source) |
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CRYPTOPP_SET_FUNCTION_ENTRY(Modulus) |
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CRYPTOPP_SET_FUNCTION_ENTRY(PublicExponent) |
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; |
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} |
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// ***************************************************************************** |
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class RSAPrimeSelector : public PrimeSelector |
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{ |
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public: |
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RSAPrimeSelector(const Integer &e) : m_e(e) {} |
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bool IsAcceptable(const Integer &candidate) const {return RelativelyPrime(m_e, candidate-Integer::One());} |
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Integer m_e; |
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}; |
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void InvertibleRSAFunction::GenerateRandom(RandomNumberGenerator &rng, const NameValuePairs &alg) |
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{ |
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int modulusSize = 2048; |
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alg.GetIntValue(Name::ModulusSize(), modulusSize) || alg.GetIntValue(Name::KeySize(), modulusSize); |
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if (modulusSize < 16) |
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throw InvalidArgument("InvertibleRSAFunction: specified modulus size is too small"); |
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m_e = alg.GetValueWithDefault(Name::PublicExponent(), Integer(17)); |
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if (m_e < 3 || m_e.IsEven()) |
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throw InvalidArgument("InvertibleRSAFunction: invalid public exponent"); |
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RSAPrimeSelector selector(m_e); |
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AlgorithmParameters primeParam = MakeParametersForTwoPrimesOfEqualSize(modulusSize) |
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(Name::PointerToPrimeSelector(), selector.GetSelectorPointer()); |
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m_p.GenerateRandom(rng, primeParam); |
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m_q.GenerateRandom(rng, primeParam); |
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m_d = m_e.InverseMod(LCM(m_p-1, m_q-1)); |
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assert(m_d.IsPositive()); |
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m_dp = m_d % (m_p-1); |
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m_dq = m_d % (m_q-1); |
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m_n = m_p * m_q; |
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m_u = m_q.InverseMod(m_p); |
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if (FIPS_140_2_ComplianceEnabled()) |
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{ |
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RSASS<PKCS1v15, SHA>::Signer signer(*this); |
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RSASS<PKCS1v15, SHA>::Verifier verifier(signer); |
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SignaturePairwiseConsistencyTest_FIPS_140_Only(signer, verifier); |
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RSAES<OAEP<SHA> >::Decryptor decryptor(*this); |
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RSAES<OAEP<SHA> >::Encryptor encryptor(decryptor); |
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EncryptionPairwiseConsistencyTest_FIPS_140_Only(encryptor, decryptor); |
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} |
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} |
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void InvertibleRSAFunction::Initialize(RandomNumberGenerator &rng, unsigned int keybits, const Integer &e) |
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{ |
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GenerateRandom(rng, MakeParameters(Name::ModulusSize(), (int)keybits)(Name::PublicExponent(), e+e.IsEven())); |
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} |
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void InvertibleRSAFunction::Initialize(const Integer &n, const Integer &e, const Integer &d) |
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{ |
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if (n.IsEven() || e.IsEven() | d.IsEven()) |
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throw InvalidArgument("InvertibleRSAFunction: input is not a valid RSA private key"); |
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m_n = n; |
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m_e = e; |
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m_d = d; |
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Integer r = --(d*e); |
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unsigned int s = 0; |
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while (r.IsEven()) |
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{ |
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r >>= 1; |
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s++; |
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} |
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ModularArithmetic modn(n); |
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for (Integer i = 2; ; ++i) |
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{ |
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Integer a = modn.Exponentiate(i, r); |
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if (a == 1) |
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continue; |
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Integer b; |
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unsigned int j = 0; |
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while (a != n-1) |
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{ |
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b = modn.Square(a); |
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if (b == 1) |
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{ |
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m_p = GCD(a-1, n); |
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m_q = n/m_p; |
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m_dp = m_d % (m_p-1); |
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m_dq = m_d % (m_q-1); |
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m_u = m_q.InverseMod(m_p); |
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return; |
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} |
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if (++j == s) |
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throw InvalidArgument("InvertibleRSAFunction: input is not a valid RSA private key"); |
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a = b; |
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} |
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} |
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} |
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void InvertibleRSAFunction::BERDecodePrivateKey(BufferedTransformation &bt, bool, size_t) |
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{ |
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BERSequenceDecoder privateKey(bt); |
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word32 version; |
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BERDecodeUnsigned<word32>(privateKey, version, INTEGER, 0, 0); // check version |
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m_n.BERDecode(privateKey); |
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m_e.BERDecode(privateKey); |
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m_d.BERDecode(privateKey); |
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m_p.BERDecode(privateKey); |
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m_q.BERDecode(privateKey); |
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m_dp.BERDecode(privateKey); |
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m_dq.BERDecode(privateKey); |
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m_u.BERDecode(privateKey); |
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privateKey.MessageEnd(); |
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} |
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void InvertibleRSAFunction::DEREncodePrivateKey(BufferedTransformation &bt) const |
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{ |
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DERSequenceEncoder privateKey(bt); |
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DEREncodeUnsigned<word32>(privateKey, 0); // version |
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m_n.DEREncode(privateKey); |
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m_e.DEREncode(privateKey); |
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m_d.DEREncode(privateKey); |
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m_p.DEREncode(privateKey); |
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m_q.DEREncode(privateKey); |
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m_dp.DEREncode(privateKey); |
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m_dq.DEREncode(privateKey); |
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m_u.DEREncode(privateKey); |
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privateKey.MessageEnd(); |
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} |
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Integer InvertibleRSAFunction::CalculateInverse(RandomNumberGenerator &rng, const Integer &x) const |
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{ |
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DoQuickSanityCheck(); |
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ModularArithmetic modn(m_n); |
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Integer r, rInv; |
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do { // do this in a loop for people using small numbers for testing |
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r.Randomize(rng, Integer::One(), m_n - Integer::One()); |
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rInv = modn.MultiplicativeInverse(r); |
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} while (rInv.IsZero()); |
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Integer re = modn.Exponentiate(r, m_e); |
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re = modn.Multiply(re, x); // blind |
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// here we follow the notation of PKCS #1 and let u=q inverse mod p |
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// but in ModRoot, u=p inverse mod q, so we reverse the order of p and q |
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Integer y = ModularRoot(re, m_dq, m_dp, m_q, m_p, m_u); |
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y = modn.Multiply(y, rInv); // unblind |
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if (modn.Exponentiate(y, m_e) != x) // check |
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throw Exception(Exception::OTHER_ERROR, "InvertibleRSAFunction: computational error during private key operation"); |
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return y; |
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} |
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bool InvertibleRSAFunction::Validate(RandomNumberGenerator &rng, unsigned int level) const |
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{ |
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bool pass = RSAFunction::Validate(rng, level); |
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pass = pass && m_p > Integer::One() && m_p.IsOdd() && m_p < m_n; |
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pass = pass && m_q > Integer::One() && m_q.IsOdd() && m_q < m_n; |
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pass = pass && m_d > Integer::One() && m_d.IsOdd() && m_d < m_n; |
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pass = pass && m_dp > Integer::One() && m_dp.IsOdd() && m_dp < m_p; |
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pass = pass && m_dq > Integer::One() && m_dq.IsOdd() && m_dq < m_q; |
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pass = pass && m_u.IsPositive() && m_u < m_p; |
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if (level >= 1) |
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{ |
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pass = pass && m_p * m_q == m_n; |
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pass = pass && m_e*m_d % LCM(m_p-1, m_q-1) == 1; |
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pass = pass && m_dp == m_d%(m_p-1) && m_dq == m_d%(m_q-1); |
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pass = pass && m_u * m_q % m_p == 1; |
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} |
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if (level >= 2) |
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pass = pass && VerifyPrime(rng, m_p, level-2) && VerifyPrime(rng, m_q, level-2); |
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return pass; |
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} |
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bool InvertibleRSAFunction::GetVoidValue(const char *name, const std::type_info &valueType, void *pValue) const |
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{ |
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return GetValueHelper<RSAFunction>(this, name, valueType, pValue).Assignable() |
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CRYPTOPP_GET_FUNCTION_ENTRY(Prime1) |
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CRYPTOPP_GET_FUNCTION_ENTRY(Prime2) |
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CRYPTOPP_GET_FUNCTION_ENTRY(PrivateExponent) |
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CRYPTOPP_GET_FUNCTION_ENTRY(ModPrime1PrivateExponent) |
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CRYPTOPP_GET_FUNCTION_ENTRY(ModPrime2PrivateExponent) |
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CRYPTOPP_GET_FUNCTION_ENTRY(MultiplicativeInverseOfPrime2ModPrime1) |
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; |
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} |
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void InvertibleRSAFunction::AssignFrom(const NameValuePairs &source) |
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{ |
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AssignFromHelper<RSAFunction>(this, source) |
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CRYPTOPP_SET_FUNCTION_ENTRY(Prime1) |
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CRYPTOPP_SET_FUNCTION_ENTRY(Prime2) |
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CRYPTOPP_SET_FUNCTION_ENTRY(PrivateExponent) |
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CRYPTOPP_SET_FUNCTION_ENTRY(ModPrime1PrivateExponent) |
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CRYPTOPP_SET_FUNCTION_ENTRY(ModPrime2PrivateExponent) |
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CRYPTOPP_SET_FUNCTION_ENTRY(MultiplicativeInverseOfPrime2ModPrime1) |
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; |
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} |
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// ***************************************************************************** |
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Integer RSAFunction_ISO::ApplyFunction(const Integer &x) const |
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{ |
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Integer t = RSAFunction::ApplyFunction(x); |
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return t % 16 == 12 ? t : m_n - t; |
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} |
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Integer InvertibleRSAFunction_ISO::CalculateInverse(RandomNumberGenerator &rng, const Integer &x) const |
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{ |
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Integer t = InvertibleRSAFunction::CalculateInverse(rng, x); |
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return STDMIN(t, m_n-t); |
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} |
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NAMESPACE_END |
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#endif
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