// Copyright (c) 2017-2018, The Monero Project // // All rights reserved. // // Redistribution and use in source and binary forms, with or without modification, are // permitted provided that the following conditions are met: // // 1. Redistributions of source code must retain the above copyright notice, this list of // conditions and the following disclaimer. // // 2. Redistributions in binary form must reproduce the above copyright notice, this list // of conditions and the following disclaimer in the documentation and/or other // materials provided with the distribution. // // 3. Neither the name of the copyright holder nor the names of its contributors may be // used to endorse or promote products derived from this software without specific // prior written permission. // // THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND CONTRIBUTORS "AS IS" AND ANY // EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE IMPLIED WARRANTIES OF // MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL // THE COPYRIGHT HOLDER OR CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, // SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT NOT LIMITED TO, // PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; LOSS OF USE, DATA, OR PROFITS; OR BUSINESS // INTERRUPTION) HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, // STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF // THE USE OF THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE. // // Adapted from Java code by Sarang Noether #include #include #include #include #include "misc_log_ex.h" #include "common/perf_timer.h" #include "cryptonote_config.h" extern "C" { #include "crypto/crypto-ops.h" } #include "rctOps.h" #include "multiexp.h" #include "bulletproofs.h" #undef MONERO_DEFAULT_LOG_CATEGORY #define MONERO_DEFAULT_LOG_CATEGORY "bulletproofs" //#define DEBUG_BP #define PERF_TIMER_START_BP(x) PERF_TIMER_START_UNIT(x, 1000000) #define STRAUS_SIZE_LIMIT 128 #define PIPPENGER_SIZE_LIMIT 0 namespace rct { static rct::key vector_exponent(const rct::keyV &a, const rct::keyV &b); static rct::keyV vector_powers(const rct::key &x, size_t n); static rct::keyV vector_dup(const rct::key &x, size_t n); static rct::key inner_product(const rct::keyV &a, const rct::keyV &b); static constexpr size_t maxN = 64; static constexpr size_t maxM = BULLETPROOF_MAX_OUTPUTS; static rct::key Hi[maxN*maxM], Gi[maxN*maxM]; static ge_p3 Hi_p3[maxN*maxM], Gi_p3[maxN*maxM]; static std::shared_ptr straus_HiGi_cache; static std::shared_ptr pippenger_HiGi_cache; static const rct::key TWO = { {0x02, 0x00, 0x00,0x00 , 0x00, 0x00, 0x00,0x00 , 0x00, 0x00, 0x00,0x00 , 0x00, 0x00, 0x00,0x00 , 0x00, 0x00, 0x00,0x00 , 0x00, 0x00, 0x00,0x00 , 0x00, 0x00, 0x00,0x00 , 0x00, 0x00, 0x00,0x00 } }; static const rct::key MINUS_ONE = { { 0xec, 0xd3, 0xf5, 0x5c, 0x1a, 0x63, 0x12, 0x58, 0xd6, 0x9c, 0xf7, 0xa2, 0xde, 0xf9, 0xde, 0x14, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x10 } }; static const rct::key MINUS_INV_EIGHT = { { 0x74, 0xa4, 0x19, 0x7a, 0xf0, 0x7d, 0x0b, 0xf7, 0x05, 0xc2, 0xda, 0x25, 0x2b, 0x5c, 0x0b, 0x0d, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x00, 0x0a } }; static const rct::keyV oneN = vector_dup(rct::identity(), maxN); static const rct::keyV twoN = vector_powers(TWO, maxN); static const rct::key ip12 = inner_product(oneN, twoN); static boost::mutex init_mutex; static inline rct::key multiexp(const std::vector &data, bool HiGi) { if (HiGi) { static_assert(128 <= STRAUS_SIZE_LIMIT, "Straus in precalc mode can only be calculated till STRAUS_SIZE_LIMIT"); return data.size() <= 128 ? straus(data, straus_HiGi_cache, 0) : pippenger(data, pippenger_HiGi_cache, get_pippenger_c(data.size())); } else return data.size() <= 64 ? straus(data, NULL, 0) : pippenger(data, NULL, get_pippenger_c(data.size())); } static bool is_reduced(const rct::key &scalar) { rct::key reduced = scalar; sc_reduce32(reduced.bytes); return scalar == reduced; } static void add_acc_p3(ge_p3 *acc_p3, const rct::key &point) { ge_p3 p3; CHECK_AND_ASSERT_THROW_MES(ge_frombytes_vartime(&p3, point.bytes) == 0, "ge_frombytes_vartime failed"); ge_cached cached; ge_p3_to_cached(&cached, &p3); ge_p1p1 p1; ge_add(&p1, acc_p3, &cached); ge_p1p1_to_p3(acc_p3, &p1); } static void sub_acc_p3(ge_p3 *acc_p3, const rct::key &point) { ge_p3 p3; CHECK_AND_ASSERT_THROW_MES(ge_frombytes_vartime(&p3, point.bytes) == 0, "ge_frombytes_vartime failed"); ge_cached cached; ge_p3_to_cached(&cached, &p3); ge_p1p1 p1; ge_sub(&p1, acc_p3, &cached); ge_p1p1_to_p3(acc_p3, &p1); } static rct::key get_exponent(const rct::key &base, size_t idx) { static const std::string salt("bulletproof"); std::string hashed = std::string((const char*)base.bytes, sizeof(base)) + salt + tools::get_varint_data(idx); const rct::key e = rct::hashToPoint(rct::hash2rct(crypto::cn_fast_hash(hashed.data(), hashed.size()))); CHECK_AND_ASSERT_THROW_MES(!(e == rct::identity()), "Exponent is point at infinity"); return e; } static void init_exponents() { boost::lock_guard lock(init_mutex); static bool init_done = false; if (init_done) return; std::vector data; for (size_t i = 0; i < maxN*maxM; ++i) { Hi[i] = get_exponent(rct::H, i * 2); CHECK_AND_ASSERT_THROW_MES(ge_frombytes_vartime(&Hi_p3[i], Hi[i].bytes) == 0, "ge_frombytes_vartime failed"); Gi[i] = get_exponent(rct::H, i * 2 + 1); CHECK_AND_ASSERT_THROW_MES(ge_frombytes_vartime(&Gi_p3[i], Gi[i].bytes) == 0, "ge_frombytes_vartime failed"); data.push_back({rct::zero(), Gi[i]}); data.push_back({rct::zero(), Hi[i]}); } straus_HiGi_cache = straus_init_cache(data, STRAUS_SIZE_LIMIT); pippenger_HiGi_cache = pippenger_init_cache(data, PIPPENGER_SIZE_LIMIT); MINFO("Hi/Gi cache size: " << (sizeof(Hi)+sizeof(Gi))/1024 << " kB"); MINFO("Hi_p3/Gi_p3 cache size: " << (sizeof(Hi_p3)+sizeof(Gi_p3))/1024 << " kB"); MINFO("Straus cache size: " << straus_get_cache_size(straus_HiGi_cache)/1024 << " kB"); MINFO("Pippenger cache size: " << pippenger_get_cache_size(pippenger_HiGi_cache)/1024 << " kB"); size_t cache_size = (sizeof(Hi)+sizeof(Hi_p3))*2 + straus_get_cache_size(straus_HiGi_cache) + pippenger_get_cache_size(pippenger_HiGi_cache); MINFO("Total cache size: " << cache_size/1024 << "kB"); init_done = true; } /* Given two scalar arrays, construct a vector commitment */ static rct::key vector_exponent(const rct::keyV &a, const rct::keyV &b) { CHECK_AND_ASSERT_THROW_MES(a.size() == b.size(), "Incompatible sizes of a and b"); CHECK_AND_ASSERT_THROW_MES(a.size() <= maxN*maxM, "Incompatible sizes of a and maxN"); std::vector multiexp_data; multiexp_data.reserve(a.size()*2); for (size_t i = 0; i < a.size(); ++i) { multiexp_data.emplace_back(a[i], Gi_p3[i]); multiexp_data.emplace_back(b[i], Hi_p3[i]); } return multiexp(multiexp_data, true); } /* Compute a custom vector-scalar commitment */ static rct::key cross_vector_exponent8(size_t size, const std::vector &A, size_t Ao, const std::vector &B, size_t Bo, const rct::keyV &a, size_t ao, const rct::keyV &b, size_t bo, const ge_p3 *extra_point, const rct::key *extra_scalar) { CHECK_AND_ASSERT_THROW_MES(size + Ao <= A.size(), "Incompatible size for A"); CHECK_AND_ASSERT_THROW_MES(size + Bo <= B.size(), "Incompatible size for B"); CHECK_AND_ASSERT_THROW_MES(size + ao <= a.size(), "Incompatible size for a"); CHECK_AND_ASSERT_THROW_MES(size + bo <= b.size(), "Incompatible size for b"); CHECK_AND_ASSERT_THROW_MES(size <= maxN*maxM, "size is too large"); CHECK_AND_ASSERT_THROW_MES(!!extra_point == !!extra_scalar, "only one of extra point/scalar present"); std::vector multiexp_data; multiexp_data.resize(size*2 + (!!extra_point)); for (size_t i = 0; i < size; ++i) { sc_mul(multiexp_data[i*2].scalar.bytes, a[ao+i].bytes, INV_EIGHT.bytes);; multiexp_data[i*2].point = A[Ao+i]; sc_mul(multiexp_data[i*2+1].scalar.bytes, b[bo+i].bytes, INV_EIGHT.bytes); multiexp_data[i*2+1].point = B[Bo+i]; } if (extra_point) { sc_mul(multiexp_data.back().scalar.bytes, extra_scalar->bytes, INV_EIGHT.bytes); multiexp_data.back().point = *extra_point; } return multiexp(multiexp_data, false); } /* Given a scalar, construct a vector of powers */ static rct::keyV vector_powers(const rct::key &x, size_t n) { rct::keyV res(n); if (n == 0) return res; res[0] = rct::identity(); if (n == 1) return res; res[1] = x; for (size_t i = 2; i < n; ++i) { sc_mul(res[i].bytes, res[i-1].bytes, x.bytes); } return res; } /* Given a scalar, return the sum of its powers from 0 to n-1 */ static rct::key vector_power_sum(const rct::key &x, size_t n) { if (n == 0) return rct::zero(); rct::key res = rct::identity(); if (n == 1) return res; rct::key prev = x; for (size_t i = 1; i < n; ++i) { if (i > 1) sc_mul(prev.bytes, prev.bytes, x.bytes); sc_add(res.bytes, res.bytes, prev.bytes); } return res; } /* Given two scalar arrays, construct the inner product */ static rct::key inner_product(const rct::keyV &a, const rct::keyV &b) { CHECK_AND_ASSERT_THROW_MES(a.size() == b.size(), "Incompatible sizes of a and b"); rct::key res = rct::zero(); for (size_t i = 0; i < a.size(); ++i) { sc_muladd(res.bytes, a[i].bytes, b[i].bytes, res.bytes); } return res; } /* Given two scalar arrays, construct the Hadamard product */ static rct::keyV hadamard(const rct::keyV &a, const rct::keyV &b) { CHECK_AND_ASSERT_THROW_MES(a.size() == b.size(), "Incompatible sizes of a and b"); rct::keyV res(a.size()); for (size_t i = 0; i < a.size(); ++i) { sc_mul(res[i].bytes, a[i].bytes, b[i].bytes); } return res; } /* folds a curvepoint array using a two way scaled Hadamard product */ static void hadamard_fold(std::vector &v, const rct::key &a, const rct::key &b) { CHECK_AND_ASSERT_THROW_MES((v.size() & 1) == 0, "Vector size should be even"); const size_t sz = v.size() / 2; for (size_t n = 0; n < sz; ++n) { ge_dsmp c[2]; ge_dsm_precomp(c[0], &v[n]); ge_dsm_precomp(c[1], &v[sz + n]); ge_double_scalarmult_precomp_vartime2_p3(&v[n], a.bytes, c[0], b.bytes, c[1]); } v.resize(sz); } /* Add two vectors */ static rct::keyV vector_add(const rct::keyV &a, const rct::keyV &b) { CHECK_AND_ASSERT_THROW_MES(a.size() == b.size(), "Incompatible sizes of a and b"); rct::keyV res(a.size()); for (size_t i = 0; i < a.size(); ++i) { sc_add(res[i].bytes, a[i].bytes, b[i].bytes); } return res; } /* Subtract two vectors */ static rct::keyV vector_subtract(const rct::keyV &a, const rct::keyV &b) { CHECK_AND_ASSERT_THROW_MES(a.size() == b.size(), "Incompatible sizes of a and b"); rct::keyV res(a.size()); for (size_t i = 0; i < a.size(); ++i) { sc_sub(res[i].bytes, a[i].bytes, b[i].bytes); } return res; } /* Multiply a scalar and a vector */ static rct::keyV vector_scalar(const rct::keyV &a, const rct::key &x) { rct::keyV res(a.size()); for (size_t i = 0; i < a.size(); ++i) { sc_mul(res[i].bytes, a[i].bytes, x.bytes); } return res; } /* Create a vector from copies of a single value */ static rct::keyV vector_dup(const rct::key &x, size_t N) { return rct::keyV(N, x); } /* Get the sum of a vector's elements */ static rct::key vector_sum(const rct::keyV &a) { rct::key res = rct::zero(); for (size_t i = 0; i < a.size(); ++i) { sc_add(res.bytes, res.bytes, a[i].bytes); } return res; } static rct::key switch_endianness(rct::key k) { std::reverse(k.bytes, k.bytes + sizeof(k)); return k; } /* Compute the inverse of a scalar, the stupid way */ static rct::key invert(const rct::key &x) { rct::key inv; BN_CTX *ctx = BN_CTX_new(); BIGNUM *X = BN_new(); BIGNUM *L = BN_new(); BIGNUM *I = BN_new(); BN_bin2bn(switch_endianness(x).bytes, sizeof(rct::key), X); BN_bin2bn(switch_endianness(rct::curveOrder()).bytes, sizeof(rct::key), L); CHECK_AND_ASSERT_THROW_MES(BN_mod_inverse(I, X, L, ctx), "Failed to invert"); const int len = BN_num_bytes(I); CHECK_AND_ASSERT_THROW_MES((size_t)len <= sizeof(rct::key), "Invalid number length"); inv = rct::zero(); BN_bn2bin(I, inv.bytes); std::reverse(inv.bytes, inv.bytes + len); BN_free(I); BN_free(L); BN_free(X); BN_CTX_free(ctx); #ifdef DEBUG_BP rct::key tmp; sc_mul(tmp.bytes, inv.bytes, x.bytes); CHECK_AND_ASSERT_THROW_MES(tmp == rct::identity(), "invert failed"); #endif return inv; } /* Compute the slice of a vector */ static rct::keyV slice(const rct::keyV &a, size_t start, size_t stop) { CHECK_AND_ASSERT_THROW_MES(start < a.size(), "Invalid start index"); CHECK_AND_ASSERT_THROW_MES(stop <= a.size(), "Invalid stop index"); CHECK_AND_ASSERT_THROW_MES(start < stop, "Invalid start/stop indices"); rct::keyV res(stop - start); for (size_t i = start; i < stop; ++i) { res[i - start] = a[i]; } return res; } static rct::key hash_cache_mash(rct::key &hash_cache, const rct::key &mash0, const rct::key &mash1) { rct::keyV data; data.reserve(3); data.push_back(hash_cache); data.push_back(mash0); data.push_back(mash1); return hash_cache = rct::hash_to_scalar(data); } static rct::key hash_cache_mash(rct::key &hash_cache, const rct::key &mash0, const rct::key &mash1, const rct::key &mash2) { rct::keyV data; data.reserve(4); data.push_back(hash_cache); data.push_back(mash0); data.push_back(mash1); data.push_back(mash2); return hash_cache = rct::hash_to_scalar(data); } static rct::key hash_cache_mash(rct::key &hash_cache, const rct::key &mash0, const rct::key &mash1, const rct::key &mash2, const rct::key &mash3) { rct::keyV data; data.reserve(5); data.push_back(hash_cache); data.push_back(mash0); data.push_back(mash1); data.push_back(mash2); data.push_back(mash3); return hash_cache = rct::hash_to_scalar(data); } /* Given a value v (0..2^N-1) and a mask gamma, construct a range proof */ Bulletproof bulletproof_PROVE(const rct::key &sv, const rct::key &gamma) { init_exponents(); PERF_TIMER_UNIT(PROVE, 1000000); constexpr size_t logN = 6; // log2(64) constexpr size_t N = 1< 0; ) { if (sv[i/8] & (((uint64_t)1)<<(i%8))) { aL[i] = rct::identity(); } else { aL[i] = rct::zero(); } sc_sub(aR[i].bytes, aL[i].bytes, rct::identity().bytes); } PERF_TIMER_STOP(PROVE_aLaR); rct::key hash_cache = rct::hash_to_scalar(V); // DEBUG: Test to ensure this recovers the value #ifdef DEBUG_BP uint64_t test_aL = 0, test_aR = 0; for (size_t i = 0; i < N; ++i) { if (aL[i] == rct::identity()) test_aL += ((uint64_t)1)< Gprime(N); std::vector Hprime(N); rct::keyV aprime(N); rct::keyV bprime(N); const rct::key yinv = invert(y); rct::key yinvpow = rct::identity(); for (size_t i = 0; i < N; ++i) { Gprime[i] = Gi_p3[i]; ge_scalarmult_p3(&Hprime[i], yinvpow.bytes, &Hi_p3[i]); sc_mul(yinvpow.bytes, yinvpow.bytes, yinv.bytes); aprime[i] = l[i]; bprime[i] = r[i]; } rct::keyV L(logN); rct::keyV R(logN); int round = 0; rct::keyV w(logN); // this is the challenge x in the inner product protocol PERF_TIMER_STOP(PROVE_step3); PERF_TIMER_START_BP(PROVE_step4); // PAPER LINE 13 while (nprime > 1) { // PAPER LINE 15 nprime /= 2; // PAPER LINES 16-17 rct::key cL = inner_product(slice(aprime, 0, nprime), slice(bprime, nprime, bprime.size())); rct::key cR = inner_product(slice(aprime, nprime, aprime.size()), slice(bprime, 0, nprime)); // PAPER LINES 18-19 sc_mul(tmp.bytes, cL.bytes, x_ip.bytes); L[round] = cross_vector_exponent8(nprime, Gprime, nprime, Hprime, 0, aprime, 0, bprime, nprime, &ge_p3_H, &tmp); sc_mul(tmp.bytes, cR.bytes, x_ip.bytes); R[round] = cross_vector_exponent8(nprime, Gprime, 0, Hprime, nprime, aprime, nprime, bprime, 0, &ge_p3_H, &tmp); // PAPER LINES 21-22 w[round] = hash_cache_mash(hash_cache, L[round], R[round]); if (w[round] == rct::zero()) { PERF_TIMER_STOP(PROVE_step4); MINFO("w[round] is 0, trying again"); goto try_again; } // PAPER LINES 24-25 const rct::key winv = invert(w[round]); if (nprime > 1) { hadamard_fold(Gprime, winv, w[round]); hadamard_fold(Hprime, w[round], winv); } // PAPER LINES 28-29 aprime = vector_add(vector_scalar(slice(aprime, 0, nprime), w[round]), vector_scalar(slice(aprime, nprime, aprime.size()), winv)); bprime = vector_add(vector_scalar(slice(bprime, 0, nprime), winv), vector_scalar(slice(bprime, nprime, bprime.size()), w[round])); ++round; } PERF_TIMER_STOP(PROVE_step4); // PAPER LINE 58 (with inclusions from PAPER LINE 8 and PAPER LINE 20) return Bulletproof(V, A, S, T1, T2, taux, mu, std::move(L), std::move(R), aprime[0], bprime[0], t); } Bulletproof bulletproof_PROVE(uint64_t v, const rct::key &gamma) { // vG + gammaH PERF_TIMER_START_BP(PROVE_v); rct::key sv = rct::zero(); sv.bytes[0] = v & 255; sv.bytes[1] = (v >> 8) & 255; sv.bytes[2] = (v >> 16) & 255; sv.bytes[3] = (v >> 24) & 255; sv.bytes[4] = (v >> 32) & 255; sv.bytes[5] = (v >> 40) & 255; sv.bytes[6] = (v >> 48) & 255; sv.bytes[7] = (v >> 56) & 255; PERF_TIMER_STOP(PROVE_v); return bulletproof_PROVE(sv, gamma); } /* Given a set of values v (0..2^N-1) and masks gamma, construct a range proof */ Bulletproof bulletproof_PROVE(const rct::keyV &sv, const rct::keyV &gamma) { CHECK_AND_ASSERT_THROW_MES(sv.size() == gamma.size(), "Incompatible sizes of sv and gamma"); CHECK_AND_ASSERT_THROW_MES(!sv.empty(), "sv is empty"); for (const rct::key &sve: sv) CHECK_AND_ASSERT_THROW_MES(is_reduced(sve), "Invalid sv input"); for (const rct::key &g: gamma) CHECK_AND_ASSERT_THROW_MES(is_reduced(g), "Invalid gamma input"); init_exponents(); PERF_TIMER_UNIT(PROVE, 1000000); constexpr size_t logN = 6; // log2(64) constexpr size_t N = 1< 0; ) { if (j >= sv.size()) { aL[j*N+i] = rct::zero(); } else if (sv[j][i/8] & (((uint64_t)1)<<(i%8))) { aL[j*N+i] = rct::identity(); } else { aL[j*N+i] = rct::zero(); } sc_sub(aR[j*N+i].bytes, aL[j*N+i].bytes, rct::identity().bytes); } } PERF_TIMER_STOP(PROVE_aLaR); // DEBUG: Test to ensure this recovers the value #ifdef DEBUG_BP for (size_t j = 0; j < M; ++j) { uint64_t test_aL = 0, test_aR = 0; for (size_t i = 0; i < N; ++i) { if (aL[j*N+i] == rct::identity()) test_aL += ((uint64_t)1)<= (j-1)*N && i < j*N) { CHECK_AND_ASSERT_THROW_MES(1+j < zpow.size(), "invalid zpow index"); CHECK_AND_ASSERT_THROW_MES(i-(j-1)*N < twoN.size(), "invalid twoN index"); sc_muladd(zero_twos[i].bytes, zpow[1+j].bytes, twoN[i-(j-1)*N].bytes, zero_twos[i].bytes); } } } rct::keyV r0 = vector_add(aR, zMN); const auto yMN = vector_powers(y, MN); r0 = hadamard(r0, yMN); r0 = vector_add(r0, zero_twos); rct::keyV r1 = hadamard(yMN, sR); // Polynomial construction before PAPER LINE 46 rct::key t1_1 = inner_product(l0, r1); rct::key t1_2 = inner_product(l1, r0); rct::key t1; sc_add(t1.bytes, t1_1.bytes, t1_2.bytes); rct::key t2 = inner_product(l1, r1); PERF_TIMER_STOP(PROVE_step1); PERF_TIMER_START_BP(PROVE_step2); // PAPER LINES 47-48 rct::key tau1 = rct::skGen(), tau2 = rct::skGen(); rct::key T1, T2; ge_p3 p3; sc_mul(tmp.bytes, t1.bytes, INV_EIGHT.bytes); sc_mul(tmp2.bytes, tau1.bytes, INV_EIGHT.bytes); ge_double_scalarmult_base_vartime_p3(&p3, tmp.bytes, &ge_p3_H, tmp2.bytes); ge_p3_tobytes(T1.bytes, &p3); sc_mul(tmp.bytes, t2.bytes, INV_EIGHT.bytes); sc_mul(tmp2.bytes, tau2.bytes, INV_EIGHT.bytes); ge_double_scalarmult_base_vartime_p3(&p3, tmp.bytes, &ge_p3_H, tmp2.bytes); ge_p3_tobytes(T2.bytes, &p3); // PAPER LINES 49-51 rct::key x = hash_cache_mash(hash_cache, z, T1, T2); if (x == rct::zero()) { PERF_TIMER_STOP(PROVE_step2); MINFO("x is 0, trying again"); goto try_again; } // PAPER LINES 52-53 rct::key taux; sc_mul(taux.bytes, tau1.bytes, x.bytes); rct::key xsq; sc_mul(xsq.bytes, x.bytes, x.bytes); sc_muladd(taux.bytes, tau2.bytes, xsq.bytes, taux.bytes); for (size_t j = 1; j <= sv.size(); ++j) { CHECK_AND_ASSERT_THROW_MES(j+1 < zpow.size(), "invalid zpow index"); sc_muladd(taux.bytes, zpow[j+1].bytes, gamma[j-1].bytes, taux.bytes); } rct::key mu; sc_muladd(mu.bytes, x.bytes, rho.bytes, alpha.bytes); // PAPER LINES 54-57 rct::keyV l = l0; l = vector_add(l, vector_scalar(l1, x)); rct::keyV r = r0; r = vector_add(r, vector_scalar(r1, x)); PERF_TIMER_STOP(PROVE_step2); PERF_TIMER_START_BP(PROVE_step3); rct::key t = inner_product(l, r); // DEBUG: Test if the l and r vectors match the polynomial forms #ifdef DEBUG_BP rct::key test_t; const rct::key t0 = inner_product(l0, r0); sc_muladd(test_t.bytes, t1.bytes, x.bytes, t0.bytes); sc_muladd(test_t.bytes, t2.bytes, xsq.bytes, test_t.bytes); CHECK_AND_ASSERT_THROW_MES(test_t == t, "test_t check failed"); #endif // PAPER LINES 32-33 rct::key x_ip = hash_cache_mash(hash_cache, x, taux, mu, t); if (x_ip == rct::zero()) { PERF_TIMER_STOP(PROVE_step3); MINFO("x_ip is 0, trying again"); goto try_again; } // These are used in the inner product rounds size_t nprime = MN; std::vector Gprime(MN); std::vector Hprime(MN); rct::keyV aprime(MN); rct::keyV bprime(MN); const rct::key yinv = invert(y); rct::key yinvpow = rct::identity(); for (size_t i = 0; i < MN; ++i) { Gprime[i] = Gi_p3[i]; ge_scalarmult_p3(&Hprime[i], yinvpow.bytes, &Hi_p3[i]); sc_mul(yinvpow.bytes, yinvpow.bytes, yinv.bytes); aprime[i] = l[i]; bprime[i] = r[i]; } rct::keyV L(logMN); rct::keyV R(logMN); int round = 0; rct::keyV w(logMN); // this is the challenge x in the inner product protocol PERF_TIMER_STOP(PROVE_step3); PERF_TIMER_START_BP(PROVE_step4); // PAPER LINE 13 while (nprime > 1) { // PAPER LINE 15 nprime /= 2; // PAPER LINES 16-17 PERF_TIMER_START_BP(PROVE_inner_product); rct::key cL = inner_product(slice(aprime, 0, nprime), slice(bprime, nprime, bprime.size())); rct::key cR = inner_product(slice(aprime, nprime, aprime.size()), slice(bprime, 0, nprime)); PERF_TIMER_STOP(PROVE_inner_product); // PAPER LINES 18-19 PERF_TIMER_START_BP(PROVE_LR); sc_mul(tmp.bytes, cL.bytes, x_ip.bytes); L[round] = cross_vector_exponent8(nprime, Gprime, nprime, Hprime, 0, aprime, 0, bprime, nprime, &ge_p3_H, &tmp); sc_mul(tmp.bytes, cR.bytes, x_ip.bytes); R[round] = cross_vector_exponent8(nprime, Gprime, 0, Hprime, nprime, aprime, nprime, bprime, 0, &ge_p3_H, &tmp); PERF_TIMER_STOP(PROVE_LR); // PAPER LINES 21-22 w[round] = hash_cache_mash(hash_cache, L[round], R[round]); if (w[round] == rct::zero()) { PERF_TIMER_STOP(PROVE_step4); MINFO("w[round] is 0, trying again"); goto try_again; } // PAPER LINES 24-25 const rct::key winv = invert(w[round]); if (nprime > 1) { PERF_TIMER_START_BP(PROVE_hadamard2); hadamard_fold(Gprime, winv, w[round]); hadamard_fold(Hprime, w[round], winv); PERF_TIMER_STOP(PROVE_hadamard2); } // PAPER LINES 28-29 PERF_TIMER_START_BP(PROVE_prime); aprime = vector_add(vector_scalar(slice(aprime, 0, nprime), w[round]), vector_scalar(slice(aprime, nprime, aprime.size()), winv)); bprime = vector_add(vector_scalar(slice(bprime, 0, nprime), winv), vector_scalar(slice(bprime, nprime, bprime.size()), w[round])); PERF_TIMER_STOP(PROVE_prime); ++round; } PERF_TIMER_STOP(PROVE_step4); // PAPER LINE 58 (with inclusions from PAPER LINE 8 and PAPER LINE 20) return Bulletproof(std::move(V), A, S, T1, T2, taux, mu, std::move(L), std::move(R), aprime[0], bprime[0], t); } Bulletproof bulletproof_PROVE(const std::vector &v, const rct::keyV &gamma) { CHECK_AND_ASSERT_THROW_MES(v.size() == gamma.size(), "Incompatible sizes of v and gamma"); // vG + gammaH PERF_TIMER_START_BP(PROVE_v); rct::keyV sv(v.size()); for (size_t i = 0; i < v.size(); ++i) { sv[i] = rct::zero(); sv[i].bytes[0] = v[i] & 255; sv[i].bytes[1] = (v[i] >> 8) & 255; sv[i].bytes[2] = (v[i] >> 16) & 255; sv[i].bytes[3] = (v[i] >> 24) & 255; sv[i].bytes[4] = (v[i] >> 32) & 255; sv[i].bytes[5] = (v[i] >> 40) & 255; sv[i].bytes[6] = (v[i] >> 48) & 255; sv[i].bytes[7] = (v[i] >> 56) & 255; } PERF_TIMER_STOP(PROVE_v); return bulletproof_PROVE(sv, gamma); } /* Given a range proof, determine if it is valid */ bool bulletproof_VERIFY(const std::vector &proofs) { init_exponents(); PERF_TIMER_START_BP(VERIFY); // sanity and figure out which proof is longest size_t max_length = 0; for (const Bulletproof *p: proofs) { const Bulletproof &proof = *p; // check scalar range CHECK_AND_ASSERT_MES(is_reduced(proof.taux), false, "Input scalar not in range"); CHECK_AND_ASSERT_MES(is_reduced(proof.mu), false, "Input scalar not in range"); CHECK_AND_ASSERT_MES(is_reduced(proof.a), false, "Input scalar not in range"); CHECK_AND_ASSERT_MES(is_reduced(proof.b), false, "Input scalar not in range"); CHECK_AND_ASSERT_MES(is_reduced(proof.t), false, "Input scalar not in range"); CHECK_AND_ASSERT_MES(proof.V.size() >= 1, false, "V does not have at least one element"); CHECK_AND_ASSERT_MES(proof.L.size() == proof.R.size(), false, "Mismatched L and R sizes"); CHECK_AND_ASSERT_MES(proof.L.size() > 0, false, "Empty proof"); max_length = std::max(max_length, proof.L.size()); } CHECK_AND_ASSERT_MES(max_length < 32, false, "At least one proof is too large"); size_t maxMN = 1u << max_length; const size_t logN = 6; const size_t N = 1 << logN; rct::key tmp; // setup weighted aggregates rct::key Z0 = rct::identity(); rct::key z1 = rct::zero(); rct::key &Z2 = Z0; rct::key z3 = rct::zero(); rct::keyV z4(maxMN, rct::zero()), z5(maxMN, rct::zero()); rct::key Y2 = rct::identity(), &Y3 = Y2, &Y4 = Y2; rct::key y0 = rct::zero(), y1 = rct::zero(); for (const Bulletproof *p: proofs) { const Bulletproof &proof = *p; size_t M, logM; for (logM = 0; (M = 1< multiexp_data; multiexp_data.reserve(proof.V.size()); sc_sub(tmp.bytes, proof.t.bytes, tmp.bytes); sc_muladd(y1.bytes, tmp.bytes, weight.bytes, y1.bytes); for (size_t j = 0; j < proof8_V.size(); j++) { multiexp_data.emplace_back(zpow[j+2], proof8_V[j]); } rct::addKeys(Y2, Y2, rct::scalarmultKey(multiexp(multiexp_data, false), weight)); sc_mul(tmp.bytes, x.bytes, weight.bytes); rct::addKeys(Y3, Y3, rct::scalarmultKey(proof8_T1, tmp)); rct::key xsq; sc_mul(xsq.bytes, x.bytes, x.bytes); sc_mul(tmp.bytes, xsq.bytes, weight.bytes); rct::addKeys(Y4, Y4, rct::scalarmultKey(proof8_T2, tmp)); PERF_TIMER_STOP(VERIFY_line_61rl_new); PERF_TIMER_START_BP(VERIFY_line_62); // PAPER LINE 62 rct::addKeys(Z0, Z0, rct::scalarmultKey(rct::addKeys(rct::scalarmult8(proof.A), rct::scalarmultKey(proof8_S, x)), weight)); PERF_TIMER_STOP(VERIFY_line_62); // Compute the number of rounds for the inner product const size_t rounds = logM+logN; CHECK_AND_ASSERT_MES(rounds > 0, false, "Zero rounds"); PERF_TIMER_START_BP(VERIFY_line_21_22); // PAPER LINES 21-22 // The inner product challenges are computed per round rct::keyV w(rounds); for (size_t i = 0; i < rounds; ++i) { w[i] = hash_cache_mash(hash_cache, proof.L[i], proof.R[i]); CHECK_AND_ASSERT_MES(!(w[i] == rct::zero()), false, "w[i] == 0"); } PERF_TIMER_STOP(VERIFY_line_21_22); PERF_TIMER_START_BP(VERIFY_line_24_25); // Basically PAPER LINES 24-25 // Compute the curvepoints from G[i] and H[i] rct::key yinvpow = rct::identity(); rct::key ypow = rct::identity(); PERF_TIMER_START_BP(VERIFY_line_24_25_invert); const rct::key yinv = invert(y); rct::keyV winv(rounds); for (size_t i = 0; i < rounds; ++i) winv[i] = invert(w[i]); PERF_TIMER_STOP(VERIFY_line_24_25_invert); // precalc PERF_TIMER_START_BP(VERIFY_line_24_25_precalc); rct::keyV w_cache(1< 0; --s) { sc_mul(w_cache[s].bytes, w_cache[s/2].bytes, w[j].bytes); sc_mul(w_cache[s-1].bytes, w_cache[s/2].bytes, winv[j].bytes); } } PERF_TIMER_STOP(VERIFY_line_24_25_precalc); for (size_t i = 0; i < MN; ++i) { rct::key g_scalar = proof.a; rct::key h_scalar; if (i == 0) h_scalar = proof.b; else sc_mul(h_scalar.bytes, proof.b.bytes, yinvpow.bytes); // Convert the index to binary IN REVERSE and construct the scalar exponent sc_mul(g_scalar.bytes, g_scalar.bytes, w_cache[i].bytes); sc_mul(h_scalar.bytes, h_scalar.bytes, w_cache[(~i) & (MN-1)].bytes); // Adjust the scalars using the exponents from PAPER LINE 62 sc_add(g_scalar.bytes, g_scalar.bytes, z.bytes); CHECK_AND_ASSERT_MES(2+i/N < zpow.size(), false, "invalid zpow index"); CHECK_AND_ASSERT_MES(i%N < twoN.size(), false, "invalid twoN index"); sc_mul(tmp.bytes, zpow[2+i/N].bytes, twoN[i%N].bytes); if (i == 0) { sc_add(tmp.bytes, tmp.bytes, z.bytes); sc_sub(h_scalar.bytes, h_scalar.bytes, tmp.bytes); } else { sc_muladd(tmp.bytes, z.bytes, ypow.bytes, tmp.bytes); sc_mulsub(h_scalar.bytes, tmp.bytes, yinvpow.bytes, h_scalar.bytes); } sc_muladd(z4[i].bytes, g_scalar.bytes, weight.bytes, z4[i].bytes); sc_muladd(z5[i].bytes, h_scalar.bytes, weight.bytes, z5[i].bytes); if (i == 0) { yinvpow = yinv; ypow = y; } else if (i != MN-1) { sc_mul(yinvpow.bytes, yinvpow.bytes, yinv.bytes); sc_mul(ypow.bytes, ypow.bytes, y.bytes); } } PERF_TIMER_STOP(VERIFY_line_24_25); // PAPER LINE 26 PERF_TIMER_START_BP(VERIFY_line_26_new); multiexp_data.clear(); multiexp_data.reserve(2*rounds); sc_muladd(z1.bytes, proof.mu.bytes, weight.bytes, z1.bytes); for (size_t i = 0; i < rounds; ++i) { sc_mul(tmp.bytes, w[i].bytes, w[i].bytes); multiexp_data.emplace_back(tmp, proof8_L[i]); sc_mul(tmp.bytes, winv[i].bytes, winv[i].bytes); multiexp_data.emplace_back(tmp, proof8_R[i]); } rct::key acc = multiexp(multiexp_data, false); rct::addKeys(Z2, Z2, rct::scalarmultKey(acc, weight)); sc_mulsub(tmp.bytes, proof.a.bytes, proof.b.bytes, proof.t.bytes); sc_mul(tmp.bytes, tmp.bytes, x_ip.bytes); sc_muladd(z3.bytes, tmp.bytes, weight.bytes, z3.bytes); PERF_TIMER_STOP(VERIFY_line_26_new); } // now check all proofs at once PERF_TIMER_START_BP(VERIFY_step2_check); ge_p3 check1; ge_double_scalarmult_base_vartime_p3(&check1, y1.bytes, &ge_p3_H, y0.bytes); sub_acc_p3(&check1, Y2); if (!ge_p3_is_point_at_infinity(&check1)) { MERROR("Verification failure at step 1"); return false; } ge_p3 check2; sc_sub(tmp.bytes, rct::zero().bytes, z1.bytes); ge_double_scalarmult_base_vartime_p3(&check2, z3.bytes, &ge_p3_H, tmp.bytes); add_acc_p3(&check2, Z0); std::vector multiexp_data; multiexp_data.reserve(2 * maxMN); for (size_t i = 0; i < maxMN; ++i) { multiexp_data.emplace_back(z4[i], Gi_p3[i]); multiexp_data.emplace_back(z5[i], Hi_p3[i]); } sub_acc_p3(&check2, multiexp(multiexp_data, true)); PERF_TIMER_STOP(VERIFY_step2_check); if (!ge_p3_is_point_at_infinity(&check2)) { MERROR("Verification failure at step 2"); return false; } PERF_TIMER_STOP(VERIFY); return true; } bool bulletproof_VERIFY(const std::vector &proofs) { std::vector proof_pointers; for (const Bulletproof &proof: proofs) proof_pointers.push_back(&proof); return bulletproof_VERIFY(proof_pointers); } bool bulletproof_VERIFY(const Bulletproof &proof) { std::vector proofs; proofs.push_back(&proof); return bulletproof_VERIFY(proofs); } }