boringssl/crypto/fipsmodule/ecdsa
Andres Erbsen 46304abf7d ec/p256.c: fiat-crypto field arithmetic (64, 32)
The fiat-crypto-generated code uses the Montgomery form implementation
strategy, for both 32-bit and 64-bit code.

64-bit throughput seems slower, but the difference is smaller than noise between repetitions (-2%?)

32-bit throughput has decreased significantly for ECDH (-40%). I am
attributing this to the change from varibale-time scalar multiplication
to constant-time scalar multiplication. Due to the same bottleneck,
ECDSA verification still uses the old code (otherwise there would have
been a 60% throughput decrease). On the other hand, ECDSA signing
throughput has increased slightly (+10%), perhaps due to the use of a
precomputed table of multiples of the base point.

64-bit benchmarks (Google Cloud Haswell):

with this change:
Did 9126 ECDH P-256 operations in 1009572us (9039.5 ops/sec)
Did 23000 ECDSA P-256 signing operations in 1039832us (22119.0 ops/sec)
Did 8820 ECDSA P-256 verify operations in 1024242us (8611.2 ops/sec)

master (40e8c921ca):
Did 9340 ECDH P-256 operations in 1017975us (9175.1 ops/sec)
Did 23000 ECDSA P-256 signing operations in 1039820us (22119.2 ops/sec)
Did 8688 ECDSA P-256 verify operations in 1021108us (8508.4 ops/sec)

benchmarks on ARMv7 (LG Nexus 4):

with this change:
Did 150 ECDH P-256 operations in 1029726us (145.7 ops/sec)
Did 506 ECDSA P-256 signing operations in 1065192us (475.0 ops/sec)
Did 363 ECDSA P-256 verify operations in 1033298us (351.3 ops/sec)

master (2fce1beda0):
Did 245 ECDH P-256 operations in 1017518us (240.8 ops/sec)
Did 473 ECDSA P-256 signing operations in 1086281us (435.4 ops/sec)
Did 360 ECDSA P-256 verify operations in 1003846us (358.6 ops/sec)

64-bit tables converted as follows:

import re, sys, math

p = 2**256 - 2**224 + 2**192 + 2**96 - 1
R = 2**256

def convert(t):
    x0, s1, x1, s2, x2, s3, x3 = t.groups()
    v = int(x0, 0) + 2**64 * (int(x1, 0) + 2**64*(int(x2,0) + 2**64*(int(x3, 0)) ))
    w = v*R%p
    y0 = hex(w%(2**64))
    y1 = hex((w>>64)%(2**64))
    y2 = hex((w>>(2*64))%(2**64))
    y3 = hex((w>>(3*64))%(2**64))
    ww = int(y0, 0) + 2**64 * (int(y1, 0) + 2**64*(int(y2,0) + 2**64*(int(y3, 0)) ))
    if ww != v*R%p:
        print(x0,x1,x2,x3)
        print(hex(v))
        print(y0,y1,y2,y3)
        print(hex(w))
        print(hex(ww))
        assert 0
    return '{'+y0+s1+y1+s2+y2+s3+y3+'}'

fe_re = re.compile('{'+r'(\s*,\s*)'.join(r'(\d+|0x[abcdefABCDEF0123456789]+)' for i in range(4)) + '}')
print (re.sub(fe_re, convert, sys.stdin.read()).rstrip('\n'))

32-bit tables converted from 64-bit tables

Change-Id: I52d6e5504fcb6ca2e8b0ee13727f4500c80c1799
Reviewed-on: https://boringssl-review.googlesource.com/23244
Commit-Queue: Adam Langley <agl@google.com>
Reviewed-by: Adam Langley <agl@google.com>
CQ-Verified: CQ bot account: commit-bot@chromium.org <commit-bot@chromium.org>
2017-12-11 17:55:46 +00:00
..
ecdsa_sign_tests.txt
ecdsa_test.cc
ecdsa_verify_tests.txt
ecdsa.c ec/p256.c: fiat-crypto field arithmetic (64, 32) 2017-12-11 17:55:46 +00:00