#! /usr/bin/env perl # Copyright 2010-2016 The OpenSSL Project Authors. All Rights Reserved. # # Licensed under the OpenSSL license (the "License"). You may not use # this file except in compliance with the License. You can obtain a copy # in the file LICENSE in the source distribution or at # https://www.openssl.org/source/license.html # # ==================================================================== # Written by Andy Polyakov for the OpenSSL # project. The module is, however, dual licensed under OpenSSL and # CRYPTOGAMS licenses depending on where you obtain it. For further # details see http://www.openssl.org/~appro/cryptogams/. # ==================================================================== # # March, May, June 2010 # # The module implements "4-bit" GCM GHASH function and underlying # single multiplication operation in GF(2^128). "4-bit" means that it # uses 256 bytes per-key table [+64/128 bytes fixed table]. It has two # code paths: vanilla x86 and vanilla SSE. Former will be executed on # 486 and Pentium, latter on all others. SSE GHASH features so called # "528B" variant of "4-bit" method utilizing additional 256+16 bytes # of per-key storage [+512 bytes shared table]. Performance results # are for streamed GHASH subroutine and are expressed in cycles per # processed byte, less is better: # # gcc 2.95.3(*) SSE assembler x86 assembler # # Pentium 105/111(**) - 50 # PIII 68 /75 12.2 24 # P4 125/125 17.8 84(***) # Opteron 66 /70 10.1 30 # Core2 54 /67 8.4 18 # Atom 105/105 16.8 53 # VIA Nano 69 /71 13.0 27 # # (*) gcc 3.4.x was observed to generate few percent slower code, # which is one of reasons why 2.95.3 results were chosen, # another reason is lack of 3.4.x results for older CPUs; # comparison with SSE results is not completely fair, because C # results are for vanilla "256B" implementation, while # assembler results are for "528B";-) # (**) second number is result for code compiled with -fPIC flag, # which is actually more relevant, because assembler code is # position-independent; # (***) see comment in non-MMX routine for further details; # # To summarize, it's >2-5 times faster than gcc-generated code. To # anchor it to something else SHA1 assembler processes one byte in # ~7 cycles on contemporary x86 cores. As for choice of MMX/SSE # in particular, see comment at the end of the file... # May 2010 # # Add PCLMULQDQ version performing at 2.10 cycles per processed byte. # The question is how close is it to theoretical limit? The pclmulqdq # instruction latency appears to be 14 cycles and there can't be more # than 2 of them executing at any given time. This means that single # Karatsuba multiplication would take 28 cycles *plus* few cycles for # pre- and post-processing. Then multiplication has to be followed by # modulo-reduction. Given that aggregated reduction method [see # "Carry-less Multiplication and Its Usage for Computing the GCM Mode" # white paper by Intel] allows you to perform reduction only once in # a while we can assume that asymptotic performance can be estimated # as (28+Tmod/Naggr)/16, where Tmod is time to perform reduction # and Naggr is the aggregation factor. # # Before we proceed to this implementation let's have closer look at # the best-performing code suggested by Intel in their white paper. # By tracing inter-register dependencies Tmod is estimated as ~19 # cycles and Naggr chosen by Intel is 4, resulting in 2.05 cycles per # processed byte. As implied, this is quite optimistic estimate, # because it does not account for Karatsuba pre- and post-processing, # which for a single multiplication is ~5 cycles. Unfortunately Intel # does not provide performance data for GHASH alone. But benchmarking # AES_GCM_encrypt ripped out of Fig. 15 of the white paper with aadt # alone resulted in 2.46 cycles per byte of out 16KB buffer. Note that # the result accounts even for pre-computing of degrees of the hash # key H, but its portion is negligible at 16KB buffer size. # # Moving on to the implementation in question. Tmod is estimated as # ~13 cycles and Naggr is 2, giving asymptotic performance of ... # 2.16. How is it possible that measured performance is better than # optimistic theoretical estimate? There is one thing Intel failed # to recognize. By serializing GHASH with CTR in same subroutine # former's performance is really limited to above (Tmul + Tmod/Naggr) # equation. But if GHASH procedure is detached, the modulo-reduction # can be interleaved with Naggr-1 multiplications at instruction level # and under ideal conditions even disappear from the equation. So that # optimistic theoretical estimate for this implementation is ... # 28/16=1.75, and not 2.16. Well, it's probably way too optimistic, # at least for such small Naggr. I'd argue that (28+Tproc/Naggr), # where Tproc is time required for Karatsuba pre- and post-processing, # is more realistic estimate. In this case it gives ... 1.91 cycles. # Or in other words, depending on how well we can interleave reduction # and one of the two multiplications the performance should be between # 1.91 and 2.16. As already mentioned, this implementation processes # one byte out of 8KB buffer in 2.10 cycles, while x86_64 counterpart # - in 2.02. x86_64 performance is better, because larger register # bank allows to interleave reduction and multiplication better. # # Does it make sense to increase Naggr? To start with it's virtually # impossible in 32-bit mode, because of limited register bank # capacity. Otherwise improvement has to be weighed against slower # setup, as well as code size and complexity increase. As even # optimistic estimate doesn't promise 30% performance improvement, # there are currently no plans to increase Naggr. # # Special thanks to David Woodhouse for providing access to a # Westmere-based system on behalf of Intel Open Source Technology Centre. # January 2010 # # Tweaked to optimize transitions between integer and FP operations # on same XMM register, PCLMULQDQ subroutine was measured to process # one byte in 2.07 cycles on Sandy Bridge, and in 2.12 - on Westmere. # The minor regression on Westmere is outweighed by ~15% improvement # on Sandy Bridge. Strangely enough attempt to modify 64-bit code in # similar manner resulted in almost 20% degradation on Sandy Bridge, # where original 64-bit code processes one byte in 1.95 cycles. ##################################################################### # For reference, AMD Bulldozer processes one byte in 1.98 cycles in # 32-bit mode and 1.89 in 64-bit. # February 2013 # # Overhaul: aggregate Karatsuba post-processing, improve ILP in # reduction_alg9. Resulting performance is 1.96 cycles per byte on # Westmere, 1.95 - on Sandy/Ivy Bridge, 1.76 - on Bulldozer. # This file was patched in BoringSSL to remove the variable-time 4-bit # implementation. # The first two arguments should always be the flavour and output file path. if ($#ARGV < 1) { die "Not enough arguments provided. Two arguments are necessary: the flavour and the output file path."; } $0 =~ m/(.*[\/\\])[^\/\\]+$/; $dir=$1; push(@INC,"${dir}","${dir}../../../perlasm"); require "x86asm.pl"; $output=$ARGV[1]; open STDOUT,">$output"; &asm_init($ARGV[0],$x86only = $ARGV[$#ARGV] eq "386"); $sse2=0; for (@ARGV) { $sse2=1 if (/-DOPENSSL_IA32_SSE2/); } if (!$x86only) {{{ if ($sse2) {{ ###################################################################### # PCLMULQDQ version. $Xip="eax"; $Htbl="edx"; $const="ecx"; $inp="esi"; $len="ebx"; ($Xi,$Xhi)=("xmm0","xmm1"); $Hkey="xmm2"; ($T1,$T2,$T3)=("xmm3","xmm4","xmm5"); ($Xn,$Xhn)=("xmm6","xmm7"); &static_label("bswap"); sub clmul64x64_T2 { # minimal "register" pressure my ($Xhi,$Xi,$Hkey,$HK)=@_; &movdqa ($Xhi,$Xi); # &pshufd ($T1,$Xi,0b01001110); &pshufd ($T2,$Hkey,0b01001110) if (!defined($HK)); &pxor ($T1,$Xi); # &pxor ($T2,$Hkey) if (!defined($HK)); $HK=$T2 if (!defined($HK)); &pclmulqdq ($Xi,$Hkey,0x00); ####### &pclmulqdq ($Xhi,$Hkey,0x11); ####### &pclmulqdq ($T1,$HK,0x00); ####### &xorps ($T1,$Xi); # &xorps ($T1,$Xhi); # &movdqa ($T2,$T1); # &psrldq ($T1,8); &pslldq ($T2,8); # &pxor ($Xhi,$T1); &pxor ($Xi,$T2); # } sub clmul64x64_T3 { # Even though this subroutine offers visually better ILP, it # was empirically found to be a tad slower than above version. # At least in gcm_ghash_clmul context. But it's just as well, # because loop modulo-scheduling is possible only thanks to # minimized "register" pressure... my ($Xhi,$Xi,$Hkey)=@_; &movdqa ($T1,$Xi); # &movdqa ($Xhi,$Xi); &pclmulqdq ($Xi,$Hkey,0x00); ####### &pclmulqdq ($Xhi,$Hkey,0x11); ####### &pshufd ($T2,$T1,0b01001110); # &pshufd ($T3,$Hkey,0b01001110); &pxor ($T2,$T1); # &pxor ($T3,$Hkey); &pclmulqdq ($T2,$T3,0x00); ####### &pxor ($T2,$Xi); # &pxor ($T2,$Xhi); # &movdqa ($T3,$T2); # &psrldq ($T2,8); &pslldq ($T3,8); # &pxor ($Xhi,$T2); &pxor ($Xi,$T3); # } if (1) { # Algorithm 9 with <<1 twist. # Reduction is shorter and uses only two # temporary registers, which makes it better # candidate for interleaving with 64x64 # multiplication. Pre-modulo-scheduled loop # was found to be ~20% faster than Algorithm 5 # below. Algorithm 9 was therefore chosen for # further optimization... sub reduction_alg9 { # 17/11 times faster than Intel version my ($Xhi,$Xi) = @_; # 1st phase &movdqa ($T2,$Xi); # &movdqa ($T1,$Xi); &psllq ($Xi,5); &pxor ($T1,$Xi); # &psllq ($Xi,1); &pxor ($Xi,$T1); # &psllq ($Xi,57); # &movdqa ($T1,$Xi); # &pslldq ($Xi,8); &psrldq ($T1,8); # &pxor ($Xi,$T2); &pxor ($Xhi,$T1); # # 2nd phase &movdqa ($T2,$Xi); &psrlq ($Xi,1); &pxor ($Xhi,$T2); # &pxor ($T2,$Xi); &psrlq ($Xi,5); &pxor ($Xi,$T2); # &psrlq ($Xi,1); # &pxor ($Xi,$Xhi) # } &function_begin_B("gcm_init_clmul"); &mov ($Htbl,&wparam(0)); &mov ($Xip,&wparam(1)); &call (&label("pic")); &set_label("pic"); &blindpop ($const); &lea ($const,&DWP(&label("bswap")."-".&label("pic"),$const)); &movdqu ($Hkey,&QWP(0,$Xip)); &pshufd ($Hkey,$Hkey,0b01001110);# dword swap # <<1 twist &pshufd ($T2,$Hkey,0b11111111); # broadcast uppermost dword &movdqa ($T1,$Hkey); &psllq ($Hkey,1); &pxor ($T3,$T3); # &psrlq ($T1,63); &pcmpgtd ($T3,$T2); # broadcast carry bit &pslldq ($T1,8); &por ($Hkey,$T1); # H<<=1 # magic reduction &pand ($T3,&QWP(16,$const)); # 0x1c2_polynomial &pxor ($Hkey,$T3); # if(carry) H^=0x1c2_polynomial # calculate H^2 &movdqa ($Xi,$Hkey); &clmul64x64_T2 ($Xhi,$Xi,$Hkey); &reduction_alg9 ($Xhi,$Xi); &pshufd ($T1,$Hkey,0b01001110); &pshufd ($T2,$Xi,0b01001110); &pxor ($T1,$Hkey); # Karatsuba pre-processing &movdqu (&QWP(0,$Htbl),$Hkey); # save H &pxor ($T2,$Xi); # Karatsuba pre-processing &movdqu (&QWP(16,$Htbl),$Xi); # save H^2 &palignr ($T2,$T1,8); # low part is H.lo^H.hi &movdqu (&QWP(32,$Htbl),$T2); # save Karatsuba "salt" &ret (); &function_end_B("gcm_init_clmul"); &function_begin_B("gcm_gmult_clmul"); &mov ($Xip,&wparam(0)); &mov ($Htbl,&wparam(1)); &call (&label("pic")); &set_label("pic"); &blindpop ($const); &lea ($const,&DWP(&label("bswap")."-".&label("pic"),$const)); &movdqu ($Xi,&QWP(0,$Xip)); &movdqa ($T3,&QWP(0,$const)); &movups ($Hkey,&QWP(0,$Htbl)); &pshufb ($Xi,$T3); &movups ($T2,&QWP(32,$Htbl)); &clmul64x64_T2 ($Xhi,$Xi,$Hkey,$T2); &reduction_alg9 ($Xhi,$Xi); &pshufb ($Xi,$T3); &movdqu (&QWP(0,$Xip),$Xi); &ret (); &function_end_B("gcm_gmult_clmul"); &function_begin("gcm_ghash_clmul"); &mov ($Xip,&wparam(0)); &mov ($Htbl,&wparam(1)); &mov ($inp,&wparam(2)); &mov ($len,&wparam(3)); &call (&label("pic")); &set_label("pic"); &blindpop ($const); &lea ($const,&DWP(&label("bswap")."-".&label("pic"),$const)); &movdqu ($Xi,&QWP(0,$Xip)); &movdqa ($T3,&QWP(0,$const)); &movdqu ($Hkey,&QWP(0,$Htbl)); &pshufb ($Xi,$T3); &sub ($len,0x10); &jz (&label("odd_tail")); ####### # Xi+2 =[H*(Ii+1 + Xi+1)] mod P = # [(H*Ii+1) + (H*Xi+1)] mod P = # [(H*Ii+1) + H^2*(Ii+Xi)] mod P # &movdqu ($T1,&QWP(0,$inp)); # Ii &movdqu ($Xn,&QWP(16,$inp)); # Ii+1 &pshufb ($T1,$T3); &pshufb ($Xn,$T3); &movdqu ($T3,&QWP(32,$Htbl)); &pxor ($Xi,$T1); # Ii+Xi &pshufd ($T1,$Xn,0b01001110); # H*Ii+1 &movdqa ($Xhn,$Xn); &pxor ($T1,$Xn); # &lea ($inp,&DWP(32,$inp)); # i+=2 &pclmulqdq ($Xn,$Hkey,0x00); ####### &pclmulqdq ($Xhn,$Hkey,0x11); ####### &pclmulqdq ($T1,$T3,0x00); ####### &movups ($Hkey,&QWP(16,$Htbl)); # load H^2 &nop (); &sub ($len,0x20); &jbe (&label("even_tail")); &jmp (&label("mod_loop")); &set_label("mod_loop",32); &pshufd ($T2,$Xi,0b01001110); # H^2*(Ii+Xi) &movdqa ($Xhi,$Xi); &pxor ($T2,$Xi); # &nop (); &pclmulqdq ($Xi,$Hkey,0x00); ####### &pclmulqdq ($Xhi,$Hkey,0x11); ####### &pclmulqdq ($T2,$T3,0x10); ####### &movups ($Hkey,&QWP(0,$Htbl)); # load H &xorps ($Xi,$Xn); # (H*Ii+1) + H^2*(Ii+Xi) &movdqa ($T3,&QWP(0,$const)); &xorps ($Xhi,$Xhn); &movdqu ($Xhn,&QWP(0,$inp)); # Ii &pxor ($T1,$Xi); # aggregated Karatsuba post-processing &movdqu ($Xn,&QWP(16,$inp)); # Ii+1 &pxor ($T1,$Xhi); # &pshufb ($Xhn,$T3); &pxor ($T2,$T1); # &movdqa ($T1,$T2); # &psrldq ($T2,8); &pslldq ($T1,8); # &pxor ($Xhi,$T2); &pxor ($Xi,$T1); # &pshufb ($Xn,$T3); &pxor ($Xhi,$Xhn); # "Ii+Xi", consume early &movdqa ($Xhn,$Xn); #&clmul64x64_TX ($Xhn,$Xn,$Hkey); H*Ii+1 &movdqa ($T2,$Xi); #&reduction_alg9($Xhi,$Xi); 1st phase &movdqa ($T1,$Xi); &psllq ($Xi,5); &pxor ($T1,$Xi); # &psllq ($Xi,1); &pxor ($Xi,$T1); # &pclmulqdq ($Xn,$Hkey,0x00); ####### &movups ($T3,&QWP(32,$Htbl)); &psllq ($Xi,57); # &movdqa ($T1,$Xi); # &pslldq ($Xi,8); &psrldq ($T1,8); # &pxor ($Xi,$T2); &pxor ($Xhi,$T1); # &pshufd ($T1,$Xhn,0b01001110); &movdqa ($T2,$Xi); # 2nd phase &psrlq ($Xi,1); &pxor ($T1,$Xhn); &pxor ($Xhi,$T2); # &pclmulqdq ($Xhn,$Hkey,0x11); ####### &movups ($Hkey,&QWP(16,$Htbl)); # load H^2 &pxor ($T2,$Xi); &psrlq ($Xi,5); &pxor ($Xi,$T2); # &psrlq ($Xi,1); # &pxor ($Xi,$Xhi) # &pclmulqdq ($T1,$T3,0x00); ####### &lea ($inp,&DWP(32,$inp)); &sub ($len,0x20); &ja (&label("mod_loop")); &set_label("even_tail"); &pshufd ($T2,$Xi,0b01001110); # H^2*(Ii+Xi) &movdqa ($Xhi,$Xi); &pxor ($T2,$Xi); # &pclmulqdq ($Xi,$Hkey,0x00); ####### &pclmulqdq ($Xhi,$Hkey,0x11); ####### &pclmulqdq ($T2,$T3,0x10); ####### &movdqa ($T3,&QWP(0,$const)); &xorps ($Xi,$Xn); # (H*Ii+1) + H^2*(Ii+Xi) &xorps ($Xhi,$Xhn); &pxor ($T1,$Xi); # aggregated Karatsuba post-processing &pxor ($T1,$Xhi); # &pxor ($T2,$T1); # &movdqa ($T1,$T2); # &psrldq ($T2,8); &pslldq ($T1,8); # &pxor ($Xhi,$T2); &pxor ($Xi,$T1); # &reduction_alg9 ($Xhi,$Xi); &test ($len,$len); &jnz (&label("done")); &movups ($Hkey,&QWP(0,$Htbl)); # load H &set_label("odd_tail"); &movdqu ($T1,&QWP(0,$inp)); # Ii &pshufb ($T1,$T3); &pxor ($Xi,$T1); # Ii+Xi &clmul64x64_T2 ($Xhi,$Xi,$Hkey); # H*(Ii+Xi) &reduction_alg9 ($Xhi,$Xi); &set_label("done"); &pshufb ($Xi,$T3); &movdqu (&QWP(0,$Xip),$Xi); &function_end("gcm_ghash_clmul"); } else { # Algorithm 5. Kept for reference purposes. sub reduction_alg5 { # 19/16 times faster than Intel version my ($Xhi,$Xi)=@_; # <<1 &movdqa ($T1,$Xi); # &movdqa ($T2,$Xhi); &pslld ($Xi,1); &pslld ($Xhi,1); # &psrld ($T1,31); &psrld ($T2,31); # &movdqa ($T3,$T1); &pslldq ($T1,4); &psrldq ($T3,12); # &pslldq ($T2,4); &por ($Xhi,$T3); # &por ($Xi,$T1); &por ($Xhi,$T2); # # 1st phase &movdqa ($T1,$Xi); &movdqa ($T2,$Xi); &movdqa ($T3,$Xi); # &pslld ($T1,31); &pslld ($T2,30); &pslld ($Xi,25); # &pxor ($T1,$T2); &pxor ($T1,$Xi); # &movdqa ($T2,$T1); # &pslldq ($T1,12); &psrldq ($T2,4); # &pxor ($T3,$T1); # 2nd phase &pxor ($Xhi,$T3); # &movdqa ($Xi,$T3); &movdqa ($T1,$T3); &psrld ($Xi,1); # &psrld ($T1,2); &psrld ($T3,7); # &pxor ($Xi,$T1); &pxor ($Xhi,$T2); &pxor ($Xi,$T3); # &pxor ($Xi,$Xhi); # } &function_begin_B("gcm_init_clmul"); &mov ($Htbl,&wparam(0)); &mov ($Xip,&wparam(1)); &call (&label("pic")); &set_label("pic"); &blindpop ($const); &lea ($const,&DWP(&label("bswap")."-".&label("pic"),$const)); &movdqu ($Hkey,&QWP(0,$Xip)); &pshufd ($Hkey,$Hkey,0b01001110);# dword swap # calculate H^2 &movdqa ($Xi,$Hkey); &clmul64x64_T3 ($Xhi,$Xi,$Hkey); &reduction_alg5 ($Xhi,$Xi); &movdqu (&QWP(0,$Htbl),$Hkey); # save H &movdqu (&QWP(16,$Htbl),$Xi); # save H^2 &ret (); &function_end_B("gcm_init_clmul"); &function_begin_B("gcm_gmult_clmul"); &mov ($Xip,&wparam(0)); &mov ($Htbl,&wparam(1)); &call (&label("pic")); &set_label("pic"); &blindpop ($const); &lea ($const,&DWP(&label("bswap")."-".&label("pic"),$const)); &movdqu ($Xi,&QWP(0,$Xip)); &movdqa ($Xn,&QWP(0,$const)); &movdqu ($Hkey,&QWP(0,$Htbl)); &pshufb ($Xi,$Xn); &clmul64x64_T3 ($Xhi,$Xi,$Hkey); &reduction_alg5 ($Xhi,$Xi); &pshufb ($Xi,$Xn); &movdqu (&QWP(0,$Xip),$Xi); &ret (); &function_end_B("gcm_gmult_clmul"); &function_begin("gcm_ghash_clmul"); &mov ($Xip,&wparam(0)); &mov ($Htbl,&wparam(1)); &mov ($inp,&wparam(2)); &mov ($len,&wparam(3)); &call (&label("pic")); &set_label("pic"); &blindpop ($const); &lea ($const,&DWP(&label("bswap")."-".&label("pic"),$const)); &movdqu ($Xi,&QWP(0,$Xip)); &movdqa ($T3,&QWP(0,$const)); &movdqu ($Hkey,&QWP(0,$Htbl)); &pshufb ($Xi,$T3); &sub ($len,0x10); &jz (&label("odd_tail")); ####### # Xi+2 =[H*(Ii+1 + Xi+1)] mod P = # [(H*Ii+1) + (H*Xi+1)] mod P = # [(H*Ii+1) + H^2*(Ii+Xi)] mod P # &movdqu ($T1,&QWP(0,$inp)); # Ii &movdqu ($Xn,&QWP(16,$inp)); # Ii+1 &pshufb ($T1,$T3); &pshufb ($Xn,$T3); &pxor ($Xi,$T1); # Ii+Xi &clmul64x64_T3 ($Xhn,$Xn,$Hkey); # H*Ii+1 &movdqu ($Hkey,&QWP(16,$Htbl)); # load H^2 &sub ($len,0x20); &lea ($inp,&DWP(32,$inp)); # i+=2 &jbe (&label("even_tail")); &set_label("mod_loop"); &clmul64x64_T3 ($Xhi,$Xi,$Hkey); # H^2*(Ii+Xi) &movdqu ($Hkey,&QWP(0,$Htbl)); # load H &pxor ($Xi,$Xn); # (H*Ii+1) + H^2*(Ii+Xi) &pxor ($Xhi,$Xhn); &reduction_alg5 ($Xhi,$Xi); ####### &movdqa ($T3,&QWP(0,$const)); &movdqu ($T1,&QWP(0,$inp)); # Ii &movdqu ($Xn,&QWP(16,$inp)); # Ii+1 &pshufb ($T1,$T3); &pshufb ($Xn,$T3); &pxor ($Xi,$T1); # Ii+Xi &clmul64x64_T3 ($Xhn,$Xn,$Hkey); # H*Ii+1 &movdqu ($Hkey,&QWP(16,$Htbl)); # load H^2 &sub ($len,0x20); &lea ($inp,&DWP(32,$inp)); &ja (&label("mod_loop")); &set_label("even_tail"); &clmul64x64_T3 ($Xhi,$Xi,$Hkey); # H^2*(Ii+Xi) &pxor ($Xi,$Xn); # (H*Ii+1) + H^2*(Ii+Xi) &pxor ($Xhi,$Xhn); &reduction_alg5 ($Xhi,$Xi); &movdqa ($T3,&QWP(0,$const)); &test ($len,$len); &jnz (&label("done")); &movdqu ($Hkey,&QWP(0,$Htbl)); # load H &set_label("odd_tail"); &movdqu ($T1,&QWP(0,$inp)); # Ii &pshufb ($T1,$T3); &pxor ($Xi,$T1); # Ii+Xi &clmul64x64_T3 ($Xhi,$Xi,$Hkey); # H*(Ii+Xi) &reduction_alg5 ($Xhi,$Xi); &movdqa ($T3,&QWP(0,$const)); &set_label("done"); &pshufb ($Xi,$T3); &movdqu (&QWP(0,$Xip),$Xi); &function_end("gcm_ghash_clmul"); } &set_label("bswap",64); &data_byte(15,14,13,12,11,10,9,8,7,6,5,4,3,2,1,0); &data_byte(1,0,0,0,0,0,0,0,0,0,0,0,0,0,0,0xc2); # 0x1c2_polynomial }} # $sse2 }}} # !$x86only &asciz("GHASH for x86, CRYPTOGAMS by "); &asm_finish(); close STDOUT or die "error closing STDOUT: $!"; # A question was risen about choice of vanilla MMX. Or rather why wasn't # SSE2 chosen instead? In addition to the fact that MMX runs on legacy # CPUs such as PIII, "4-bit" MMX version was observed to provide better # performance than *corresponding* SSE2 one even on contemporary CPUs. # SSE2 results were provided by Peter-Michael Hager. He maintains SSE2 # implementation featuring full range of lookup-table sizes, but with # per-invocation lookup table setup. Latter means that table size is # chosen depending on how much data is to be hashed in every given call, # more data - larger table. Best reported result for Core2 is ~4 cycles # per processed byte out of 64KB block. This number accounts even for # 64KB table setup overhead. As discussed in gcm128.c we choose to be # more conservative in respect to lookup table sizes, but how do the # results compare? Minimalistic "256B" MMX version delivers ~11 cycles # on same platform. As also discussed in gcm128.c, next in line "8-bit # Shoup's" or "4KB" method should deliver twice the performance of # "256B" one, in other words not worse than ~6 cycles per byte. It # should be also be noted that in SSE2 case improvement can be "super- # linear," i.e. more than twice, mostly because >>8 maps to single # instruction on SSE2 register. This is unlike "4-bit" case when >>4 # maps to same amount of instructions in both MMX and SSE2 cases. # Bottom line is that switch to SSE2 is considered to be justifiable # only in case we choose to implement "8-bit" method...