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Endomorphism acceleration for Scalar Multiplication (#44) * Add MultiScalar recoding from "Efficient and Secure Algorithms for GLV-Based Scalar Multiplication" by Faz et al * precompute cube root of unity - Add VM precomputation of Fp - workaround upstream bug https://github.com/nim-lang/Nim/issues/14585 * Add the φ-accelerated lookup table builder * Add a dedicated bithacks file * cosmetic import consistency * Build the φ precompute table with n-1 EC additions instead of 2^(n-1) additions * remove binary * Add the GLV precomputations to the sage scripts * You can't avoid it, bigint multiplication is needed at one point * Add bigint multiplication discarding some low words * Implement the lattice decomposition in sage * Proper decomposition for BN254 * Prepare the code for a new scalar mul * We compile, and now debugging hunt * More helpers to debug GLV scalar Mul * Fix conditional negation * Endomorphism accelerated scalar mul working for BN254 curve * Implement endomorphism acceleration for BLS12-381 (needed cofactor clearing of the point) * fix nimble test script after bench rename
2020-06-14 13:39:06 +00:00
# Constantine
# Copyright (c) 2018-2019 Status Research & Development GmbH
# Copyright (c) 2020-Present Mamy André-Ratsimbazafy
# Licensed and distributed under either of
# * MIT license (license terms in the root directory or at http://opensource.org/licenses/MIT).
# * Apache v2 license (license terms in the root directory or at http://www.apache.org/licenses/LICENSE-2.0).
# at your option. This file may not be copied, modified, or distributed except according to those terms.
# ############################################################
#
# BN254 GLV Endomorphism
# Lattice Decomposition
#
# ############################################################
# Parameters
u = Integer('0x44E992B44A6909F1')
p = 36*u^4 + 36*u^3 + 24*u^2 + 6*u + 1
r = 36*u^4 + 36*u^3 + 18*u^2 + 6*u + 1
cofactor = 1
# Cube root of unity (mod r) formula for any BN curves
lambda1_r = (-(36*u^3+18*u^2+6*u+2))
assert lambda1_r^3 % r == 1
print('λᵩ1 : ' + lambda1_r.hex())
print('λᵩ1+r: ' + (lambda1_r+r).hex())
lambda2_r = (36*u^4-1)
assert lambda2_r^3 % r == 1
print('λᵩ2 : ' + lambda2_r.hex())
# Finite fields
F = GF(p)
# K2.<u> = PolynomialRing(F)
# F2.<beta> = F.extension(u^2+9)
# K6.<v> = PolynomialRing(F2)
# F6.<eta> = F2.extension(v^3-beta)
# K12.<w> = PolynomialRing(F6)
# K12.<gamma> = F6.extension(w^2-eta)
# Curves
b = 3
G1 = EllipticCurve(F, [0, b])
# G2 = EllipticCurve(F2, [0, b/beta])
(phi1, phi2) = (root for root in GF(p)(1).nth_root(3, all=True) if root != 1)
print('𝜑1 :' + Integer(phi1).hex())
print('𝜑2 :' + Integer(phi2).hex())
# Test generator
set_random_seed(1337)
# Check
def checkEndo():
P = G1.random_point()
assert P != G1([0, 1, 0]) # Infinity
(Px, Py, Pz) = P
Qendo1 = G1([Px*phi1 % p, Py, Pz])
Qendo2 = G1([Px*phi2 % p, Py, Pz])
Q1 = lambda1_r * P
Q2 = lambda2_r * P
assert P != Q1
assert P != Q2
assert (F(Px)*F(phi1))^3 == F(Px)^3
assert (F(Px)*F(phi2))^3 == F(Px)^3
assert Q1 == Qendo1
assert Q2 == Qendo1
print('Endomorphism OK with 𝜑1')
checkEndo()
# Lattice
b = [
[2*u+1, 6*u^2+4*u+1],
[6*u^2+2*u, -2*u-1]
]
# Babai rounding
ahat = [2*u+1, 6*u^2+4*u+1]
v = int(r).bit_length()
v = int(((v + 64 - 1) // 64) * 64) # round to next multiple of 64
l = [Integer(a << v) // r for a in ahat]
def getGLV2_decomp(scalar):
a0 = (l[0] * scalar) >> v
a1 = (l[1] * scalar) >> v
k0 = scalar - a0 * b[0][0] - a1 * b[1][0]
k1 = 0 - a0 * b[0][1] - a1 * b[1][1]
assert int(k0).bit_length() <= (int(r).bit_length() + 1) // 2
assert int(k1).bit_length() <= (int(r).bit_length() + 1) // 2
assert scalar == (k0 + k1 * (lambda1_r % r)) % r
assert scalar == (k0 + k1 * (lambda2_r % r)) % r
return k0, k1
def recodeScalars(k):
m = 2
l = ((int(r).bit_length() + m-1) // m) + 1 # l = ⌈log2 r/m⌉ + 1
b = [[0] * l, [0] * l]
b[0][l-1] = 1
for i in range(0, l-1): # l-2 inclusive
b[0][i] = 2 * ((k[0] >> (i+1)) & 1) - 1
for j in range(1, m):
for i in range(0, l):
b[j][i] = b[0][i] * (k[j] & 1)
k[j] = (k[j]//2) - (b[j][i] // 2)
return b
def buildLut(P0, P1):
m = 2
lut = [0] * (1 << (m-1))
lut[0] = P0
lut[1] = P0 + P1
return lut
def pointToString(P):
(Px, Py, Pz) = P
return '(x: ' + Integer(Px).hex() + ', y: ' + Integer(Py).hex() + ', z: ' + Integer(Pz).hex() + ')'
def scalarMulGLV(scalar, P0):
m = 2
L = ((int(r).bit_length() + m-1) // m) + 1 # l = ⌈log2 r/m⌉ + 1
print('L: ' + str(L))
print('scalar: ' + Integer(scalar).hex())
k0, k1 = getGLV2_decomp(scalar)
print('k0: ' + k0.hex())
print('k1: ' + k1.hex())
P1 = (lambda1_r % r) * P0
(Px, Py, Pz) = P0
P1_endo = G1([Px*phi1 % p, Py, Pz])
assert P1 == P1_endo
expected = scalar * P0
decomp = k0*P0 + k1*P1
assert expected == decomp
print('------ recode scalar -----------')
even = k0 & 1 == 1
if even:
k0 -= 1
b = recodeScalars([k0, k1])
print('b0: ' + str(list(reversed(b[0]))))
print('b1: ' + str(list(reversed(b[1]))))
print('------------ lut ---------------')
lut = buildLut(P0, P1)
print('------------ mul ---------------')
print('b0 L-1: ' + str(b[0][L-1]))
Q = b[0][L-1] * lut[b[1][L-1] & 1]
for i in range(L-2, -1, -1):
Q *= 2
Q += b[0][i] * lut[b[1][i] & 1]
if even:
Q += P0
print('final Q: ' + pointToString(Q))
print('expected: ' + pointToString(expected))
assert Q == expected # TODO debug
# Test generator
set_random_seed(1337)
for i in range(1):
print('---------------------------------------')
# scalar = randrange(r) # Pick an integer below curve order
# P = G1.random_point()
scalar = Integer('0x0e08a292f940cfb361cc82bc24ca564f51453708c9745a9cf8707b11c84bc448')
P = G1([
Integer('0x22d3af0f3ee310df7fc1a2a204369ac13eb4a48d969a27fcd2861506b2dc0cd7'),
Integer('0x1c994169687886ccd28dd587c29c307fb3cab55d796d73a5be0bbf9aab69912e'),
Integer(1)
])
scalarMulGLV(scalar, P)