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20e50ec7f7
The mixRing (output keys and commitments) and II fields (key images) can be reconstructed from vin data. This saves some modest amount of space in the tx.
613 lines
26 KiB
C++
613 lines
26 KiB
C++
// Copyright (c) 2016, Monero Research Labs
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//
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// Author: Shen Noether <shen.noether@gmx.com>
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//
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// All rights reserved.
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//
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// Redistribution and use in source and binary forms, with or without modification, are
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// permitted provided that the following conditions are met:
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//
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// 1. Redistributions of source code must retain the above copyright notice, this list of
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// conditions and the following disclaimer.
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//
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// 2. Redistributions in binary form must reproduce the above copyright notice, this list
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// of conditions and the following disclaimer in the documentation and/or other
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// materials provided with the distribution.
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//
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// 3. Neither the name of the copyright holder nor the names of its contributors may be
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// used to endorse or promote products derived from this software without specific
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// prior written permission.
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//
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// THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS "AS IS" AND ANY
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// EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE IMPLIED WARRANTIES OF
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// MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL
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// THE COPYRIGHT HOLDER OR CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL,
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// SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO,
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// PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS
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// INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT,
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// STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF
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// THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE.
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#include "misc_log_ex.h"
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#include "rctSigs.h"
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using namespace crypto;
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using namespace std;
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namespace rct {
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//Schnorr Non-linkable
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//Gen Gives a signature (L1, s1, s2) proving that the sender knows "x" such that xG = one of P1 or P2
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//Ver Verifies that signer knows an "x" such that xG = one of P1 or P2
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//These are called in the below ASNL sig generation
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void GenSchnorrNonLinkable(key & L1, key & s1, key & s2, const key & x, const key & P1, const key & P2, int index) {
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key c1, c2, L2;
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key a = skGen();
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if (index == 0) {
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scalarmultBase(L1, a);
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hash_to_scalar(c2, L1);
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skGen(s2);
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addKeys2(L2, s2, c2, P2);
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hash_to_scalar(c1, L2);
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//s1 = a - x * c1
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sc_mulsub(s1.bytes, x.bytes, c1.bytes, a.bytes);
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}
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else if (index == 1) {
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scalarmultBase(L2, a);
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hash_to_scalar(c1, L2);
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skGen(s1);
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addKeys2(L1, s1, c1, P1);
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hash_to_scalar(c2, L1);
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sc_mulsub(s2.bytes, x.bytes, c2.bytes, a.bytes);
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}
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else {
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throw std::runtime_error("GenSchnorrNonLinkable: invalid index (should be 0 or 1)");
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}
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}
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//Schnorr Non-linkable
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//Gen Gives a signature (L1, s1, s2) proving that the sender knows "x" such that xG = one of P1 or P2
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//Ver Verifies that signer knows an "x" such that xG = one of P1 or P2
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//These are called in the below ASNL sig generation
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bool VerSchnorrNonLinkable(const key & P1, const key & P2, const key & L1, const key & s1, const key & s2) {
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key c2, L2, c1, L1p;
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hash_to_scalar(c2, L1);
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addKeys2(L2, s2, c2, P2);
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hash_to_scalar(c1, L2);
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addKeys2(L1p, s1, c1, P1);
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return equalKeys(L1, L1p);
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}
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//Aggregate Schnorr Non-linkable Ring Signature (ASNL)
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// c.f. http://eprint.iacr.org/2015/1098 section 5.
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// These are used in range proofs (alternatively Borromean could be used)
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// Gen gives a signature which proves the signer knows, for each i,
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// an x[i] such that x[i]G = one of P1[i] or P2[i]
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// Ver Verifies the signer knows a key for one of P1[i], P2[i] at each i
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asnlSig GenASNL(key64 x, key64 P1, key64 P2, bits indices) {
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DP("Generating Aggregate Schnorr Non-linkable Ring Signature\n");
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key64 s1;
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int j = 0;
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asnlSig rv;
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rv.s = zero();
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for (j = 0; j < ATOMS; j++) {
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GenSchnorrNonLinkable(rv.L1[j], s1[j], rv.s2[j], x[j], P1[j], P2[j], (int)indices[j]);
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sc_add(rv.s.bytes, rv.s.bytes, s1[j].bytes);
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}
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return rv;
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}
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//Aggregate Schnorr Non-linkable Ring Signature (ASNL)
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// c.f. http://eprint.iacr.org/2015/1098 section 5.
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// These are used in range proofs (alternatively Borromean could be used)
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// Gen gives a signature which proves the signer knows, for each i,
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// an x[i] such that x[i]G = one of P1[i] or P2[i]
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// Ver Verifies the signer knows a key for one of P1[i], P2[i] at each i
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bool VerASNL(const key64 P1, const key64 P2, const asnlSig &as) {
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DP("Verifying Aggregate Schnorr Non-linkable Ring Signature\n");
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key LHS = identity();
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key RHS = scalarmultBase(as.s);
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key c2, L2, c1;
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int j = 0;
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for (j = 0; j < ATOMS; j++) {
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hash_to_scalar(c2, as.L1[j]);
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addKeys2(L2, as.s2[j], c2, P2[j]);
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addKeys(LHS, LHS, as.L1[j]);
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hash_to_scalar(c1, L2);
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addKeys(RHS, RHS, scalarmultKey(P1[j], c1));
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}
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key cc;
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sc_sub(cc.bytes, LHS.bytes, RHS.bytes);
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return sc_isnonzero(cc.bytes) == 0;
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}
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//Multilayered Spontaneous Anonymous Group Signatures (MLSAG signatures)
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//These are aka MG signatutes in earlier drafts of the ring ct paper
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// c.f. http://eprint.iacr.org/2015/1098 section 2.
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// keyImageV just does I[i] = xx[i] * Hash(xx[i] * G) for each i
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// Gen creates a signature which proves that for some column in the keymatrix "pk"
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// the signer knows a secret key for each row in that column
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// Ver verifies that the MG sig was created correctly
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keyV keyImageV(const keyV &xx) {
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keyV II(xx.size());
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size_t i = 0;
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for (i = 0; i < xx.size(); i++) {
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II[i] = scalarmultKey(hashToPoint(scalarmultBase(xx[i])), xx[i]);
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}
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return II;
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}
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//Multilayered Spontaneous Anonymous Group Signatures (MLSAG signatures)
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//This is a just slghtly more efficient version than the ones described below
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//(will be explained in more detail in Ring Multisig paper
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//These are aka MG signatutes in earlier drafts of the ring ct paper
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// c.f. http://eprint.iacr.org/2015/1098 section 2.
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// keyImageV just does I[i] = xx[i] * Hash(xx[i] * G) for each i
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// Gen creates a signature which proves that for some column in the keymatrix "pk"
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// the signer knows a secret key for each row in that column
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// Ver verifies that the MG sig was created correctly
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mgSig MLSAG_Gen(key message, const keyM & pk, const keyV & xx, const unsigned int index) {
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mgSig rv;
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size_t cols = pk.size();
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CHECK_AND_ASSERT_THROW_MES(cols >= 2, "Error! What is c if cols = 1!");
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CHECK_AND_ASSERT_THROW_MES(index < cols, "Index out of range");
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size_t rows = pk[0].size();
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CHECK_AND_ASSERT_THROW_MES(rows >= 1, "Empty pk");
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for (size_t i = 1; i < cols; ++i) {
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CHECK_AND_ASSERT_THROW_MES(pk[i].size() == rows, "pk is not rectangular");
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}
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CHECK_AND_ASSERT_THROW_MES(xx.size() == rows, "Bad xx size");
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size_t i = 0, j = 0;
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key c, c_old, L, R, Hi;
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sc_0(c_old.bytes);
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vector<geDsmp> Ip(rows);
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rv.II = keyV(rows);
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rv.ss = keyM(cols, rv.II);
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keyV alpha(rows);
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keyV aG(rows);
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keyV aHP(rows);
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key m2hash;
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unsigned char m2[128];
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memcpy(m2, message.bytes, 32);
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DP("here1");
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for (i = 0; i < rows; i++) {
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skpkGen(alpha[i], aG[i]); //need to save alphas for later..
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Hi = hashToPoint(pk[index][i]);
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aHP[i] = scalarmultKey(Hi, alpha[i]);
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memcpy(m2+32, pk[index][i].bytes, 32);
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memcpy(m2 + 64, aG[i].bytes, 32);
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memcpy(m2 + 96, aHP[i].bytes, 32);
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rv.II[i] = scalarmultKey(Hi, xx[i]);
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precomp(Ip[i].k, rv.II[i]);
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m2hash = hash_to_scalar128(m2);
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sc_add(c_old.bytes, c_old.bytes, m2hash.bytes);
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}
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i = (index + 1) % cols;
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if (i == 0) {
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copy(rv.cc, c_old);
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}
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while (i != index) {
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rv.ss[i] = skvGen(rows);
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sc_0(c.bytes);
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for (j = 0; j < rows; j++) {
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addKeys2(L, rv.ss[i][j], c_old, pk[i][j]);
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hashToPoint(Hi, pk[i][j]);
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addKeys3(R, rv.ss[i][j], Hi, c_old, Ip[j].k);
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memcpy(m2+32, pk[i][j].bytes, 32);
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memcpy(m2 + 64, L.bytes, 32);
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memcpy(m2 + 96, R.bytes, 32);
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m2hash = hash_to_scalar128(m2);
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sc_add(c.bytes, c.bytes, m2hash.bytes);
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}
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copy(c_old, c);
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i = (i + 1) % cols;
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if (i == 0) {
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copy(rv.cc, c_old);
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}
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}
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for (j = 0; j < rows; j++) {
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sc_mulsub(rv.ss[index][j].bytes, c.bytes, xx[j].bytes, alpha[j].bytes);
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}
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return rv;
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}
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//Multilayered Spontaneous Anonymous Group Signatures (MLSAG signatures)
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//This is a just slghtly more efficient version than the ones described below
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//(will be explained in more detail in Ring Multisig paper
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//These are aka MG signatutes in earlier drafts of the ring ct paper
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// c.f. http://eprint.iacr.org/2015/1098 section 2.
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// keyImageV just does I[i] = xx[i] * Hash(xx[i] * G) for each i
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// Gen creates a signature which proves that for some column in the keymatrix "pk"
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// the signer knows a secret key for each row in that column
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// Ver verifies that the MG sig was created correctly
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bool MLSAG_Ver(key message, const keyM & pk, const mgSig & rv, const keyV &II) {
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size_t cols = pk.size();
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CHECK_AND_ASSERT_MES(cols >= 2, false, "Error! What is c if cols = 1!");
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size_t rows = pk[0].size();
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CHECK_AND_ASSERT_MES(rows >= 1, false, "Empty pk");
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for (size_t i = 1; i < cols; ++i) {
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CHECK_AND_ASSERT_MES(pk[i].size() == rows, false, "pk is not rectangular");
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}
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CHECK_AND_ASSERT_MES(II.size() == rows, false, "Bad II size");
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CHECK_AND_ASSERT_MES(rv.ss.size() == cols, false, "Bad rv.ss size");
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for (size_t i = 0; i < cols; ++i) {
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CHECK_AND_ASSERT_MES(rv.ss[i].size() == rows, false, "rv.ss is not rectangular");
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}
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size_t i = 0, j = 0;
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key c, L, R, Hi;
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key c_old = copy(rv.cc);
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vector<geDsmp> Ip(rows);
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for (i= 0 ; i< rows ; i++) {
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precomp(Ip[i].k, II[i]);
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}
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unsigned char m2[128];
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memcpy(m2, message.bytes, 32);
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key m2hash;
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i = 0;
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while (i < cols) {
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sc_0(c.bytes);
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for (j = 0; j < rows; j++) {
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addKeys2(L, rv.ss[i][j], c_old, pk[i][j]);
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hashToPoint(Hi, pk[i][j]);
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addKeys3(R, rv.ss[i][j], Hi, c_old, Ip[j].k);
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memcpy(m2 + 32, pk[i][j].bytes, 32);
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memcpy(m2 + 64, L.bytes, 32);
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memcpy(m2 + 96, R.bytes, 32);
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m2hash = hash_to_scalar128(m2);
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sc_add(c.bytes, c.bytes, m2hash.bytes);
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}
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copy(c_old, c);
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i = (i + 1);
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}
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sc_sub(c.bytes, c_old.bytes, rv.cc.bytes);
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return sc_isnonzero(c.bytes) == 0;
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}
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//proveRange and verRange
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//proveRange gives C, and mask such that \sumCi = C
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// c.f. http://eprint.iacr.org/2015/1098 section 5.1
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// and Ci is a commitment to either 0 or 2^i, i=0,...,63
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// thus this proves that "amount" is in [0, 2^64]
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// mask is a such that C = aG + bH, and b = amount
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//verRange verifies that \sum Ci = C and that each Ci is a commitment to 0 or 2^i
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rangeSig proveRange(key & C, key & mask, const xmr_amount & amount) {
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sc_0(mask.bytes);
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identity(C);
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bits b;
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d2b(b, amount);
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rangeSig sig;
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key64 ai;
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key64 CiH;
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int i = 0;
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for (i = 0; i < ATOMS; i++) {
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skGen(ai[i]);
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if (b[i] == 0) {
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scalarmultBase(sig.Ci[i], ai[i]);
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}
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if (b[i] == 1) {
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addKeys1(sig.Ci[i], ai[i], H2[i]);
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}
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subKeys(CiH[i], sig.Ci[i], H2[i]);
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sc_add(mask.bytes, mask.bytes, ai[i].bytes);
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addKeys(C, C, sig.Ci[i]);
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}
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sig.asig = GenASNL(ai, sig.Ci, CiH, b);
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return sig;
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}
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//proveRange and verRange
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//proveRange gives C, and mask such that \sumCi = C
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// c.f. http://eprint.iacr.org/2015/1098 section 5.1
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// and Ci is a commitment to either 0 or 2^i, i=0,...,63
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// thus this proves that "amount" is in [0, 2^64]
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// mask is a such that C = aG + bH, and b = amount
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//verRange verifies that \sum Ci = C and that each Ci is a commitment to 0 or 2^i
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bool verRange(const key & C, const rangeSig & as) {
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key64 CiH;
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int i = 0;
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key Ctmp = identity();
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for (i = 0; i < 64; i++) {
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subKeys(CiH[i], as.Ci[i], H2[i]);
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addKeys(Ctmp, Ctmp, as.Ci[i]);
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}
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bool reb = equalKeys(C, Ctmp);
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bool rab = VerASNL(as.Ci, CiH, as.asig);
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return (reb && rab);
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}
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//Ring-ct MG sigs
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//Prove:
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// c.f. http://eprint.iacr.org/2015/1098 section 4. definition 10.
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// This does the MG sig on the "dest" part of the given key matrix, and
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// the last row is the sum of input commitments from that column - sum output commitments
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// this shows that sum inputs = sum outputs
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//Ver:
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// verifies the above sig is created corretly
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mgSig proveRctMG(const ctkeyM & pubs, const ctkeyV & inSk, const ctkeyV &outSk, const ctkeyV & outPk, unsigned int index, key txnFeeKey, const key &base_hash) {
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mgSig mg;
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//setup vars
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size_t cols = pubs.size();
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CHECK_AND_ASSERT_THROW_MES(cols >= 1, "Empty pubs");
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size_t rows = pubs[0].size();
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CHECK_AND_ASSERT_THROW_MES(rows >= 1, "Empty pubs");
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for (size_t i = 1; i < cols; ++i) {
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CHECK_AND_ASSERT_THROW_MES(pubs[i].size() == rows, "pubs is not rectangular");
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}
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CHECK_AND_ASSERT_THROW_MES(inSk.size() == rows, "Bad inSk size");
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CHECK_AND_ASSERT_THROW_MES(outSk.size() == outPk.size(), "Bad outSk/outPk size");
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keyV sk(rows + 1);
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keyV tmp(rows + 1);
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size_t i = 0, j = 0;
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for (i = 0; i < rows + 1; i++) {
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sc_0(sk[i].bytes);
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identity(tmp[i]);
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}
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keyM M(cols, tmp);
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//create the matrix to mg sig
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for (i = 0; i < cols; i++) {
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M[i][rows] = identity();
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for (j = 0; j < rows; j++) {
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M[i][j] = pubs[i][j].dest;
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addKeys(M[i][rows], M[i][rows], pubs[i][j].mask); //add input commitments in last row
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}
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}
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sc_0(sk[rows].bytes);
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for (j = 0; j < rows; j++) {
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sk[j] = copy(inSk[j].dest);
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sc_add(sk[rows].bytes, sk[rows].bytes, inSk[j].mask.bytes); //add masks in last row
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}
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for (i = 0; i < cols; i++) {
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for (size_t j = 0; j < outPk.size(); j++) {
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subKeys(M[i][rows], M[i][rows], outPk[j].mask); //subtract output Ci's in last row
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}
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//subtract txn fee output in last row
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subKeys(M[i][rows], M[i][rows], txnFeeKey);
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}
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for (size_t j = 0; j < outPk.size(); j++) {
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sc_sub(sk[rows].bytes, sk[rows].bytes, outSk[j].mask.bytes); //subtract output masks in last row..
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}
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ctkeyV signed_data = outPk;
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signed_data.push_back(ctkey({base_hash, identity()}));
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key message = cn_fast_hash(signed_data);
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return MLSAG_Gen(message, M, sk, index);
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}
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//Ring-ct MG sigs
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//Prove:
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// c.f. http://eprint.iacr.org/2015/1098 section 4. definition 10.
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// This does the MG sig on the "dest" part of the given key matrix, and
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// the last row is the sum of input commitments from that column - sum output commitments
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// this shows that sum inputs = sum outputs
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//Ver:
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// verifies the above sig is created corretly
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bool verRctMG(mgSig mg, const keyV &II, const ctkeyM & pubs, const ctkeyV & outPk, key txnFeeKey, const key &base_hash) {
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//setup vars
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size_t cols = pubs.size();
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CHECK_AND_ASSERT_MES(cols >= 1, false, "Empty pubs");
|
|
size_t rows = pubs[0].size();
|
|
CHECK_AND_ASSERT_MES(rows >= 1, false, "Empty pubs");
|
|
for (size_t i = 1; i < cols; ++i) {
|
|
CHECK_AND_ASSERT_MES(pubs[i].size() == rows, false, "pubs is not rectangular");
|
|
}
|
|
|
|
keyV tmp(rows + 1);
|
|
size_t i = 0, j = 0;
|
|
for (i = 0; i < rows + 1; i++) {
|
|
identity(tmp[i]);
|
|
}
|
|
keyM M(cols, tmp);
|
|
|
|
//create the matrix to mg sig
|
|
for (j = 0; j < rows; j++) {
|
|
for (i = 0; i < cols; i++) {
|
|
M[i][j] = pubs[i][j].dest;
|
|
addKeys(M[i][rows], M[i][rows], pubs[i][j].mask); //add Ci in last row
|
|
}
|
|
}
|
|
for (i = 0; i < cols; i++) {
|
|
for (j = 0; j < outPk.size(); j++) {
|
|
subKeys(M[i][rows], M[i][rows], outPk[j].mask); //subtract output Ci's in last row
|
|
}
|
|
//subtract txn fee output in last row
|
|
subKeys(M[i][rows], M[i][rows], txnFeeKey);
|
|
}
|
|
ctkeyV signed_data = outPk;
|
|
signed_data.push_back(ctkey({base_hash, identity()}));
|
|
key message = cn_fast_hash(signed_data);
|
|
DP("message:");
|
|
DP(message);
|
|
return MLSAG_Ver(message, M, mg, II);
|
|
}
|
|
|
|
//These functions get keys from blockchain
|
|
//replace these when connecting blockchain
|
|
//getKeyFromBlockchain grabs a key from the blockchain at "reference_index" to mix with
|
|
//populateFromBlockchain creates a keymatrix with "mixin" columns and one of the columns is inPk
|
|
// the return value are the key matrix, and the index where inPk was put (random).
|
|
void getKeyFromBlockchain(ctkey & a, size_t reference_index) {
|
|
a.mask = pkGen();
|
|
a.dest = pkGen();
|
|
}
|
|
|
|
//These functions get keys from blockchain
|
|
//replace these when connecting blockchain
|
|
//getKeyFromBlockchain grabs a key from the blockchain at "reference_index" to mix with
|
|
//populateFromBlockchain creates a keymatrix with "mixin" + 1 columns and one of the columns is inPk
|
|
// the return value are the key matrix, and the index where inPk was put (random).
|
|
tuple<ctkeyM, xmr_amount> populateFromBlockchain(ctkeyV inPk, int mixin) {
|
|
int rows = inPk.size();
|
|
ctkeyM rv(mixin + 1, inPk);
|
|
int index = randXmrAmount(mixin);
|
|
int i = 0, j = 0;
|
|
for (i = 0; i <= mixin; i++) {
|
|
if (i != index) {
|
|
for (j = 0; j < rows; j++) {
|
|
getKeyFromBlockchain(rv[i][j], (size_t)randXmrAmount);
|
|
}
|
|
}
|
|
}
|
|
return make_tuple(rv, index);
|
|
}
|
|
|
|
//RingCT protocol
|
|
//genRct:
|
|
// creates an rctSig with all data necessary to verify the rangeProofs and that the signer owns one of the
|
|
// columns that are claimed as inputs, and that the sum of inputs = sum of outputs.
|
|
// Also contains masked "amount" and "mask" so the receiver can see how much they received
|
|
//verRct:
|
|
// verifies that all signatures (rangeProogs, MG sig, sum inputs = outputs) are correct
|
|
//decodeRct: (c.f. http://eprint.iacr.org/2015/1098 section 5.1.1)
|
|
// uses the attached ecdh info to find the amounts represented by each output commitment
|
|
// must know the destination private key to find the correct amount, else will return a random number
|
|
// Note: For txn fees, the last index in the amounts vector should contain that
|
|
// Thus the amounts vector will be "one" longer than the destinations vectort
|
|
rctSig genRct(const ctkeyV & inSk, const keyV & destinations, const vector<xmr_amount> amounts, const ctkeyM &mixRing, const key &base_hash, unsigned int index) {
|
|
CHECK_AND_ASSERT_THROW_MES(amounts.size() == destinations.size() || amounts.size() == destinations.size() + 1, "Different number of amounts/destinations");
|
|
CHECK_AND_ASSERT_THROW_MES(index < mixRing.size(), "Bad index into mixRing");
|
|
for (size_t n = 0; n < mixRing.size(); ++n) {
|
|
CHECK_AND_ASSERT_THROW_MES(mixRing[n].size() == inSk.size(), "Bad mixRing size");
|
|
}
|
|
|
|
rctSig rv;
|
|
rv.outPk.resize(destinations.size());
|
|
rv.rangeSigs.resize(destinations.size());
|
|
rv.ecdhInfo.resize(destinations.size());
|
|
|
|
size_t i = 0;
|
|
keyV masks(destinations.size()); //sk mask..
|
|
ctkeyV outSk(destinations.size());
|
|
for (i = 0; i < destinations.size(); i++) {
|
|
//add destination to sig
|
|
rv.outPk[i].dest = copy(destinations[i]);
|
|
//compute range proof
|
|
rv.rangeSigs[i] = proveRange(rv.outPk[i].mask, outSk[i].mask, amounts[i]);
|
|
#ifdef DBG
|
|
CHECK_AND_ASSERT_THROW_MES(verRange(rv.outPk[i].mask, rv.rangeSigs[i]), "verRange failed on newly created proof");
|
|
#endif
|
|
|
|
//mask amount and mask
|
|
rv.ecdhInfo[i].mask = copy(outSk[i].mask);
|
|
rv.ecdhInfo[i].amount = d2h(amounts[i]);
|
|
ecdhEncode(rv.ecdhInfo[i], destinations[i]);
|
|
|
|
}
|
|
|
|
//set txn fee
|
|
if (amounts.size() > destinations.size())
|
|
{
|
|
rv.txnFee = amounts[destinations.size()];
|
|
}
|
|
else
|
|
{
|
|
rv.txnFee = 0;
|
|
}
|
|
key txnFeeKey = scalarmultH(d2h(rv.txnFee));
|
|
|
|
rv.mixRing = mixRing;
|
|
rv.base_hash = base_hash;
|
|
rv.MG = proveRctMG(rv.mixRing, inSk, outSk, rv.outPk, index, txnFeeKey, base_hash);
|
|
return rv;
|
|
}
|
|
|
|
rctSig genRct(const ctkeyV & inSk, const ctkeyV & inPk, const keyV & destinations, const vector<xmr_amount> amounts, const key &base_hash, const int mixin) {
|
|
unsigned int index;
|
|
ctkeyM mixRing;
|
|
tie(mixRing, index) = populateFromBlockchain(inPk, mixin);
|
|
return genRct(inSk, destinations, amounts, mixRing, base_hash, index);
|
|
}
|
|
|
|
//RingCT protocol
|
|
//genRct:
|
|
// creates an rctSig with all data necessary to verify the rangeProofs and that the signer owns one of the
|
|
// columns that are claimed as inputs, and that the sum of inputs = sum of outputs.
|
|
// Also contains masked "amount" and "mask" so the receiver can see how much they received
|
|
//verRct:
|
|
// verifies that all signatures (rangeProogs, MG sig, sum inputs = outputs) are correct
|
|
//decodeRct: (c.f. http://eprint.iacr.org/2015/1098 section 5.1.1)
|
|
// uses the attached ecdh info to find the amounts represented by each output commitment
|
|
// must know the destination private key to find the correct amount, else will return a random number
|
|
bool verRct(const rctSig & rv, const ctkeyM &mixRing, const keyV &II, const key &base_hash) {
|
|
CHECK_AND_ASSERT_MES(rv.outPk.size() == rv.rangeSigs.size(), false, "Mismatched sizes of rv.outPk and rv.rangeSigs");
|
|
CHECK_AND_ASSERT_MES(rv.outPk.size() == rv.ecdhInfo.size(), false, "Mismatched sizes of rv.outPk and rv.ecdhInfo");
|
|
|
|
// some rct ops can throw
|
|
try
|
|
{
|
|
size_t i = 0;
|
|
bool rvb = true;
|
|
bool tmp;
|
|
DP("range proofs verified?");
|
|
for (i = 0; i < rv.outPk.size(); i++) {
|
|
tmp = verRange(rv.outPk[i].mask, rv.rangeSigs[i]);
|
|
DP(tmp);
|
|
rvb = (rvb && tmp);
|
|
}
|
|
//compute txn fee
|
|
key txnFeeKey = scalarmultH(d2h(rv.txnFee));
|
|
bool mgVerd = verRctMG(rv.MG, II, mixRing, rv.outPk, txnFeeKey, base_hash);
|
|
DP("mg sig verified?");
|
|
DP(mgVerd);
|
|
|
|
return (rvb && mgVerd);
|
|
}
|
|
catch(...)
|
|
{
|
|
return false;
|
|
}
|
|
}
|
|
bool verRct(const rctSig & rv) {
|
|
return verRct(rv, rv.mixRing, rv.MG.II, rv.base_hash);
|
|
}
|
|
|
|
//RingCT protocol
|
|
//genRct:
|
|
// creates an rctSig with all data necessary to verify the rangeProofs and that the signer owns one of the
|
|
// columns that are claimed as inputs, and that the sum of inputs = sum of outputs.
|
|
// Also contains masked "amount" and "mask" so the receiver can see how much they received
|
|
//verRct:
|
|
// verifies that all signatures (rangeProogs, MG sig, sum inputs = outputs) are correct
|
|
//decodeRct: (c.f. http://eprint.iacr.org/2015/1098 section 5.1.1)
|
|
// uses the attached ecdh info to find the amounts represented by each output commitment
|
|
// must know the destination private key to find the correct amount, else will return a random number
|
|
xmr_amount decodeRct(const rctSig & rv, const key & sk, unsigned int i, key & mask) {
|
|
CHECK_AND_ASSERT_THROW_MES(rv.rangeSigs.size() > 0, "Empty rv.rangeSigs");
|
|
CHECK_AND_ASSERT_THROW_MES(rv.outPk.size() == rv.rangeSigs.size(), "Mismatched sizes of rv.outPk and rv.rangeSigs");
|
|
CHECK_AND_ASSERT_THROW_MES(i < rv.ecdhInfo.size(), "Bad index");
|
|
|
|
//mask amount and mask
|
|
ecdhTuple ecdh_info = rv.ecdhInfo[i];
|
|
ecdhDecode(ecdh_info, sk);
|
|
mask = ecdh_info.mask;
|
|
key amount = ecdh_info.amount;
|
|
key C = rv.outPk[i].mask;
|
|
DP("C");
|
|
DP(C);
|
|
key Ctmp;
|
|
addKeys2(Ctmp, mask, amount, H);
|
|
DP("Ctmp");
|
|
DP(Ctmp);
|
|
if (equalKeys(C, Ctmp) == false) {
|
|
CHECK_AND_ASSERT_THROW_MES(false, "warning, amount decoded incorrectly, will be unable to spend");
|
|
}
|
|
return h2d(amount);
|
|
}
|
|
|
|
xmr_amount decodeRct(const rctSig & rv, const key & sk, unsigned int i) {
|
|
key mask;
|
|
return decodeRct(rv, sk, i, mask);
|
|
}
|
|
}
|