| /* mpz_remove -- divide out a factor and return its multiplicity. |
| |
| Copyright 1998-2002, 2012 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 either: |
| |
| * 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. |
| |
| or |
| |
| * the GNU General Public License as published by the Free Software |
| Foundation; either version 2 of the License, or (at your option) any |
| later version. |
| |
| or both in parallel, as here. |
| |
| 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 General Public License |
| for more details. |
| |
| You should have received copies of the GNU General Public License and the |
| GNU Lesser General Public License along with the GNU MP Library. If not, |
| see https://www.gnu.org/licenses/. */ |
| |
| #include "gmp-impl.h" |
| |
| mp_bitcnt_t |
| mpz_remove (mpz_ptr dest, mpz_srcptr src, mpz_srcptr f) |
| { |
| mp_bitcnt_t pwr; |
| mp_srcptr fp; |
| mp_size_t sn, fn, afn; |
| mp_limb_t fp0; |
| |
| sn = SIZ (src); |
| fn = SIZ (f); |
| fp = PTR (f); |
| afn = ABS (fn); |
| fp0 = fp[0]; |
| |
| if (UNLIKELY ((afn <= (fp0 == 1)) /* mpz_cmpabs_ui (f, 1) <= 0 */ |
| | (sn == 0))) |
| { |
| /* f = 0 or f = +- 1 or src = 0 */ |
| if (afn == 0) |
| DIVIDE_BY_ZERO; |
| mpz_set (dest, src); |
| return 0; |
| } |
| |
| if ((fp0 & 1) != 0) |
| { /* f is odd */ |
| mp_ptr dp; |
| mp_size_t dn; |
| |
| dn = ABS (sn); |
| dp = MPZ_REALLOC (dest, dn); |
| |
| pwr = mpn_remove (dp, &dn, PTR(src), dn, PTR(f), afn, ~(mp_bitcnt_t) 0); |
| |
| SIZ (dest) = ((pwr & (fn < 0)) ^ (sn < 0)) ? -dn : dn; |
| } |
| else if (afn == (fp0 == 2)) |
| { /* mpz_cmpabs_ui (f, 2) == 0 */ |
| pwr = mpz_scan1 (src, 0); |
| mpz_div_2exp (dest, src, pwr); |
| if (pwr & (fn < 0)) /*((pwr % 2 == 1) && (SIZ (f) < 0))*/ |
| mpz_neg (dest, dest); |
| } |
| else |
| { /* f != +-2 */ |
| mpz_t x, rem; |
| |
| mpz_init (rem); |
| mpz_init (x); |
| |
| pwr = 0; |
| mpz_tdiv_qr (x, rem, src, f); |
| if (SIZ (rem) == 0) |
| { |
| mpz_t fpow[GMP_LIMB_BITS]; /* Really MP_SIZE_T_BITS */ |
| int p; |
| |
| #if WANT_ORIGINAL_DEST |
| mp_ptr dp; |
| dp = PTR (dest); |
| #endif |
| /* We could perhaps compute mpz_scan1(src,0)/mpz_scan1(f,0). It is an |
| upper bound of the result we're seeking. We could also shift down the |
| operands so that they become odd, to make intermediate values |
| smaller. */ |
| mpz_init_set (fpow[0], f); |
| mpz_swap (dest, x); |
| |
| p = 1; |
| /* Divide by f, f^2 ... f^(2^k) until we get a remainder for f^(2^k). */ |
| while (ABSIZ (dest) >= 2 * ABSIZ (fpow[p - 1]) - 1) |
| { |
| mpz_init (fpow[p]); |
| mpz_mul (fpow[p], fpow[p - 1], fpow[p - 1]); |
| mpz_tdiv_qr (x, rem, dest, fpow[p]); |
| if (SIZ (rem) != 0) { |
| mpz_clear (fpow[p]); |
| break; |
| } |
| mpz_swap (dest, x); |
| p++; |
| } |
| |
| pwr = ((mp_bitcnt_t)1 << p) - 1; |
| |
| /* Divide by f^(2^(k-1)), f^(2^(k-2)), ..., f for all divisors that give |
| a zero remainder. */ |
| while (--p >= 0) |
| { |
| mpz_tdiv_qr (x, rem, dest, fpow[p]); |
| if (SIZ (rem) == 0) |
| { |
| pwr += (mp_bitcnt_t)1 << p; |
| mpz_swap (dest, x); |
| } |
| mpz_clear (fpow[p]); |
| } |
| |
| #if WANT_ORIGINAL_DEST |
| if (PTR (x) == dp) { |
| mpz_swap (dest, x); |
| mpz_set (dest, x); |
| } |
| #endif |
| } |
| else |
| mpz_set (dest, src); |
| |
| mpz_clear (x); |
| mpz_clear (rem); |
| } |
| |
| return pwr; |
| } |