Hi,
I've written a first version of a gcm_hash for x86_64, using the pclmulqdq (carryless mul) instructions. With only a single block at a time, no interleaving, this gives to 4.3 GByte/s, 0.5 cycles per byte on my laptop, one pclmulqdq every second cycle. If we could sustain one mul instruction per cycle, by interleaving, we could perhaps increase performance by another factor of two.
See below. Configure options and fat setup still missing.
Regards, /Niels
C x86_64/gcm-hash.asm
ifelse(` Copyright (C) 2022 Niels Möller
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or both in parallel, as here.
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C Common registers
define(`KEY', `%rdi') define(`P', `%xmm0') define(`BSWAP', `%xmm1') define(`H', `%xmm2') define(`D', `%xmm3') define(`T', `%xmm4')
C void gcm_init_key (union gcm_block *table)
PROLOGUE(_nettle_gcm_init_key) define(`MASK', `%xmm5') movdqa .Lpolynomial(%rip), P movdqa .Lbswap(%rip), BSWAP movups 2048(KEY), H C Middle element pshufb BSWAP, H C Multiply by x mod P, which is a left shift. movdqa H, T psllq $1, T psrlq $63, H C 127 --> 64, 63 --> 0 pshufd $0xaa, H, MASK C 64 --> (96, 64, 32, 0) pslldq $8, H C 0 --> 64 por T, H pxor T, T psubd MASK, T C All-ones if bit 127 was set pand P, T pxor T, H movups H, (KEY)
C Set D = x^{-64} H = {H0, H1} + P1 H0 pshufd $0x4e, H, D C Swap H0, H1 pclmullqhqdq P, H pxor H, D movups D, 16(KEY) ret undefine(`MASK') EPILOGUE(_nettle_gcm_init_key)
C Use pclmulqdq, doing one 64x64 --> 127 bit carry-less multiplication, C with source operands being selected from the halves of two 128-bit registers. C Variants: C pclmullqlqdq low half of both src and destination C pclmulhqlqdq low half of src register, high half of dst register C pclmullqhqdq high half of src register, low half of dst register C pclmulhqhqdq high half of both src and destination
C To do a single block, M0, M1, we need to compute C C R = M0 D1 + M1 H1 C F = M0 D0 + M1 H0 C C Corresponding to x^{-127} M H = R + x^{-64} F C C Split F as F = F1 + x^64 F0, then the final reduction is C C R + x^{-64} F = R + P1 F0 + x^{64} F0 + F1 C C In all, 5 pclmulqdq. If we we have enough registers to interleave two blocks, C final reduction is needed only once, so 9 pclmulqdq for two blocks, etc. C C We need one register each for D and H, one for P1, one each for accumulating F C and R. That uses 5 out of the 16 available xmm registers. If we interleave C blocks, we need additionan D ang H registers (for powers of the key) and the C additional message word, but we could perhaps interlave as many as 4, with two C registers left for temporaries.
define(`X', `%rsi') define(`LENGTH', `%rdx') define(`DATA', `%rcx')
define(`R', `%xmm5') define(`M', `%xmm6') define(`F', `%xmm7')
C void gcm_hash (const struct gcm_key *key, union gcm_block *x, C size_t length, const uint8_t *data)
PROLOGUE(_nettle_gcm_hash) movdqa .Lpolynomial(%rip), P movdqa .Lbswap(%rip), BSWAP movups (KEY), H movups 16(KEY), D movups (X), R pshufb BSWAP, R
sub $16, LENGTH jc .Lfinal
.Loop: movups (DATA), M pshufb BSWAP, M .Lblock: pxor M, R movdqa R, M movdqa R, F movdqa R, T pclmullqlqdq D, F C D0 * M0 pclmullqhqdq D, R C D1 * M0 pclmulhqlqdq H, T C H0 * M1 pclmulhqhqdq H, M C H1 * M1 pxor T, F pxor M, R
pshufd $0x4e, F, T C Swap halves of F pxor T, R pclmullqhqdq P, F pxor F, R
add $16, DATA sub $16, LENGTH jnc .Loop .Lfinal: add $16, LENGTH jnz .Lpartial
pshufb BSWAP, R movups R, (X) ret
.Lpartial: C Copy zero padded to stack mov %rsp, %r8 sub $16, %rsp pxor M, M movups M, (%rsp) .Lread_loop: movb (DATA), %al sub $1, %r8 movb %al, (%r8) add $1, DATA sub $1, LENGTH jnz .Lread_loop
C Move into M register, jump into loop with LENGTH = 0 movups (%rsp), M add $16, %rsp jmp .Lblock
EPILOGUE(_nettle_gcm_hash)
RODATA C The GCM polynomial is x^{128} + x^7 + x^2 + x + 1, C but in bit-reversed representation, that is C P = x^{128}+ x^{127} + x^{126} + x^{121} + 1 C We will mainly use the middle part, C P1 = (P + a + x^{128}) / x^64 = x^{563} + x^{62} + x^{57} ALIGN(16) .Lpolynomial: .byte 1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0xC2 .Lbswap: .byte 15,14,13,12,11,10,9,8,7,6,5,4,3,2,1,0