/* Implementation of the multiplication algorithm for Toom-Cook 6.5-way. Contributed to the GNU project by Marco Bodrato. THE FUNCTION IN THIS FILE IS INTERNAL WITH A MUTABLE INTERFACE. IT IS ONLY SAFE TO REACH IT THROUGH DOCUMENTED INTERFACES. IN FACT, IT IS ALMOST GUARANTEED THAT IT WILL CHANGE OR DISAPPEAR IN A FUTURE GNU MP RELEASE. Copyright 2009, 2010 Free Software Foundation, Inc. This file is part of the GNU MP Library. The GNU MP Library is free software; you can redistribute it and/or modify it under the terms of the GNU Lesser General Public License as published by the Free Software Foundation; either version 3 of the License, or (at your option) any later version. The GNU MP Library is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU Lesser General Public License for more details. You should have received a copy of the GNU Lesser General Public License along with the GNU MP Library. If not, see http://www.gnu.org/licenses/. */ #include "gmp.h" #include "gmp-impl.h" #if GMP_NUMB_BITS < 21 #error Not implemented. #endif #if TUNE_PROGRAM_BUILD #define MAYBE_mul_basecase 1 #define MAYBE_mul_toom22 1 #define MAYBE_mul_toom33 1 #define MAYBE_mul_toom6h 1 #else #define MAYBE_mul_basecase \ (MUL_TOOM6H_THRESHOLD < 6 * MUL_TOOM22_THRESHOLD) #define MAYBE_mul_toom22 \ (MUL_TOOM6H_THRESHOLD < 6 * MUL_TOOM33_THRESHOLD) #define MAYBE_mul_toom33 \ (MUL_TOOM6H_THRESHOLD < 6 * MUL_TOOM44_THRESHOLD) #define MAYBE_mul_toom6h \ (MUL_FFT_THRESHOLD >= 6 * MUL_TOOM6H_THRESHOLD) #endif #define TOOM6H_MUL_N_REC(p, a, b, n, ws) \ do { \ if (MAYBE_mul_basecase \ && BELOW_THRESHOLD (n, MUL_TOOM22_THRESHOLD)) \ mpn_mul_basecase (p, a, n, b, n); \ else if (MAYBE_mul_toom22 \ && BELOW_THRESHOLD (n, MUL_TOOM33_THRESHOLD)) \ mpn_toom22_mul (p, a, n, b, n, ws); \ else if (MAYBE_mul_toom33 \ && BELOW_THRESHOLD (n, MUL_TOOM44_THRESHOLD)) \ mpn_toom33_mul (p, a, n, b, n, ws); \ else if (! MAYBE_mul_toom6h \ || BELOW_THRESHOLD (n, MUL_TOOM6H_THRESHOLD)) \ mpn_toom44_mul (p, a, n, b, n, ws); \ else \ mpn_toom6h_mul (p, a, n, b, n, ws); \ } while (0) #define TOOM6H_MUL_REC(p, a, na, b, nb, ws) \ do { mpn_mul (p, a, na, b, nb); \ } while (0) /* Toom-6.5 , compute the product {pp,an+bn} <- {ap,an} * {bp,bn} With: an >= bn >= 46, an*6 < bn * 17. It _may_ work with bn<=46 and bn*17 < an*6 < bn*18 Evaluate in: infinity, +4, -4, +2, -2, +1, -1, +1/2, -1/2, +1/4, -1/4, 0. */ /* Estimate on needed scratch: S(n) <= (n+5)\6*10+4+MAX(S((n+5)\6),1+2*(n+5)\6), since n>42; S(n) <= ceil(log(n)/log(6))*(10+4)+n*12\6 < n*2 + lg2(n)*6 */ void mpn_toom6h_mul (mp_ptr pp, mp_srcptr ap, mp_size_t an, mp_srcptr bp, mp_size_t bn, mp_ptr scratch) { mp_size_t n, s, t; int p, q, half; int sign; /***************************** decomposition *******************************/ ASSERT( an >= bn); /* Can not handle too much unbalancement */ ASSERT( bn >= 42 ); /* Can not handle too much unbalancement */ ASSERT((an*3 < bn * 8) || ( bn >= 46 && an*6 < bn * 17 )); /* Limit num/den is a rational number between (12/11)^(log(4)/log(2*4-1)) and (12/11)^(log(6)/log(2*6-1)) */ #define LIMIT_numerator (18) #define LIMIT_denominat (17) if( an * LIMIT_denominat < LIMIT_numerator * bn ) /* is 6*... < 6*... */ { p = q = 6; } else if( an * 5 * LIMIT_numerator < LIMIT_denominat * 7 * bn ) { p = 7; q = 6; } else if( an * 5 * LIMIT_denominat < LIMIT_numerator * 7 * bn ) { p = 7; q = 5; } else if( an * LIMIT_numerator < LIMIT_denominat * 2 * bn ) /* is 4*... < 8*... */ { p = 8; q = 5; } else if( an * LIMIT_denominat < LIMIT_numerator * 2 * bn ) /* is 4*... < 8*... */ { p = 8; q = 4; } else { p = 9; q = 4; } half = (p ^ q) & 1; n = 1 + (q * an >= p * bn ? (an - 1) / (size_t) p : (bn - 1) / (size_t) q); p--; q--; s = an - p * n; t = bn - q * n; /* With LIMIT = 16/15, the following recover is needed only if bn<=73*/ if (half) { /* Recover from badly chosen splitting */ if (s<1) {p--; s+=n; half=0;} else if (t<1) {q--; t+=n; half=0;} } #undef LIMIT_numerator #undef LIMIT_denominat ASSERT (0 < s && s <= n); ASSERT (0 < t && t <= n); ASSERT (half || s + t > 3); ASSERT (n > 2); #define r4 (pp + 3 * n) /* 3n+1 */ #define r2 (pp + 7 * n) /* 3n+1 */ #define r0 (pp +11 * n) /* s+t <= 2*n */ #define r5 (scratch) /* 3n+1 */ #define r3 (scratch + 3 * n + 1) /* 3n+1 */ #define r1 (scratch + 6 * n + 2) /* 3n+1 */ #define v0 (pp + 7 * n) /* n+1 */ #define v1 (pp + 8 * n+1) /* n+1 */ #define v2 (pp + 9 * n+2) /* n+1 */ #define v3 (scratch + 9 * n + 3) /* n+1 */ #define wsi (scratch + 9 * n + 3) /* 3n+1 */ #define wse (scratch +10 * n + 4) /* 2n+1 */ /* Alloc also 3n+1 limbs for wsi... toom_interpolate_12pts may need all of them */ /* if (scratch == NULL) */ /* scratch = TMP_SALLOC_LIMBS(mpn_toom6_sqr_itch(n * 6)); */ ASSERT (12 * n + 6 <= mpn_toom6h_mul_itch(an,bn)); ASSERT (12 * n + 6 <= mpn_toom6_sqr_itch(n * 6)); /********************** evaluation and recursive calls *********************/ /* $\pm1/2$ */ sign = mpn_toom_eval_pm2rexp (v2, v0, p, ap, n, s, 1, pp) ^ mpn_toom_eval_pm2rexp (v3, v1, q, bp, n, t, 1, pp); TOOM6H_MUL_N_REC(pp, v0, v1, n + 1, wse); /* A(-1/2)*B(-1/2)*2^. */ TOOM6H_MUL_N_REC(r5, v2, v3, n + 1, wse); /* A(+1/2)*B(+1/2)*2^. */ mpn_toom_couple_handling (r5, 2 * n + 1, pp, sign, n, 1+half , half); /* $\pm1$ */ sign = mpn_toom_eval_pm1 (v2, v0, p, ap, n, s, pp); if (q == 3) sign ^= mpn_toom_eval_dgr3_pm1 (v3, v1, bp, n, t, pp); else sign ^= mpn_toom_eval_pm1 (v3, v1, q, bp, n, t, pp); TOOM6H_MUL_N_REC(pp, v0, v1, n + 1, wse); /* A(-1)*B(-1) */ TOOM6H_MUL_N_REC(r3, v2, v3, n + 1, wse); /* A(1)*B(1) */ mpn_toom_couple_handling (r3, 2 * n + 1, pp, sign, n, 0, 0); /* $\pm4$ */ sign = mpn_toom_eval_pm2exp (v2, v0, p, ap, n, s, 2, pp) ^ mpn_toom_eval_pm2exp (v3, v1, q, bp, n, t, 2, pp); TOOM6H_MUL_N_REC(pp, v0, v1, n + 1, wse); /* A(-4)*B(-4) */ TOOM6H_MUL_N_REC(r1, v2, v3, n + 1, wse); /* A(+4)*B(+4) */ mpn_toom_couple_handling (r1, 2 * n + 1, pp, sign, n, 2, 4); /* $\pm1/4$ */ sign = mpn_toom_eval_pm2rexp (v2, v0, p, ap, n, s, 2, pp) ^ mpn_toom_eval_pm2rexp (v3, v1, q, bp, n, t, 2, pp); TOOM6H_MUL_N_REC(pp, v0, v1, n + 1, wse); /* A(-1/4)*B(-1/4)*4^. */ TOOM6H_MUL_N_REC(r4, v2, v3, n + 1, wse); /* A(+1/4)*B(+1/4)*4^. */ mpn_toom_couple_handling (r4, 2 * n + 1, pp, sign, n, 2*(1+half), 2*(half)); /* $\pm2$ */ sign = mpn_toom_eval_pm2 (v2, v0, p, ap, n, s, pp) ^ mpn_toom_eval_pm2 (v3, v1, q, bp, n, t, pp); TOOM6H_MUL_N_REC(pp, v0, v1, n + 1, wse); /* A(-2)*B(-2) */ TOOM6H_MUL_N_REC(r2, v2, v3, n + 1, wse); /* A(+2)*B(+2) */ mpn_toom_couple_handling (r2, 2 * n + 1, pp, sign, n, 1, 2); #undef v0 #undef v1 #undef v2 #undef v3 #undef wse /* A(0)*B(0) */ TOOM6H_MUL_N_REC(pp, ap, bp, n, wsi); /* Infinity */ if( half != 0) { if(s>t) { TOOM6H_MUL_REC(r0, ap + p * n, s, bp + q * n, t, wsi); } else { TOOM6H_MUL_REC(r0, bp + q * n, t, ap + p * n, s, wsi); }; }; mpn_toom_interpolate_12pts (pp, r1, r3, r5, n, s+t, half, wsi); #undef r0 #undef r1 #undef r2 #undef r3 #undef r4 #undef r5 #undef wsi } #undef TOOM6H_MUL_N_REC #undef TOOM6H_MUL_REC #undef MAYBE_mul_basecase #undef MAYBE_mul_toom22 #undef MAYBE_mul_toom33 #undef MAYBE_mul_toom6h