mirror of https://gitlab.freedesktop.org/mesa/mesa
238 lines
7.8 KiB
C
238 lines
7.8 KiB
C
/*
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* Copyright © 2018 Advanced Micro Devices, Inc.
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*
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* Permission is hereby granted, free of charge, to any person obtaining a
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* copy of this software and associated documentation files (the "Software"),
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* to deal in the Software without restriction, including without limitation
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* the rights to use, copy, modify, merge, publish, distribute, sublicense,
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* and/or sell copies of the Software, and to permit persons to whom the
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* Software is furnished to do so, subject to the following conditions:
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*
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* The above copyright notice and this permission notice (including the next
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* paragraph) shall be included in all copies or substantial portions of the
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* Software.
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*
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* THE SOFTWARE IS PROVIDED "AS IS", WITHOUT WARRANTY OF ANY KIND, EXPRESS OR
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* IMPLIED, INCLUDING BUT NOT LIMITED TO THE WARRANTIES OF MERCHANTABILITY,
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* FITNESS FOR A PARTICULAR PURPOSE AND NONINFRINGEMENT. IN NO EVENT SHALL
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* THE AUTHORS OR COPYRIGHT HOLDERS BE LIABLE FOR ANY CLAIM, DAMAGES OR OTHER
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* LIABILITY, WHETHER IN AN ACTION OF CONTRACT, TORT OR OTHERWISE, ARISING
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* FROM, OUT OF OR IN CONNECTION WITH THE SOFTWARE OR THE USE OR OTHER DEALINGS
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* IN THE SOFTWARE.
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*/
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/* Imported from:
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* https://raw.githubusercontent.com/ridiculousfish/libdivide/master/divide_by_constants_codegen_reference.c
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* Paper:
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* http://ridiculousfish.com/files/faster_unsigned_division_by_constants.pdf
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*
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* The author, ridiculous_fish, wrote:
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*
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* ''Reference implementations of computing and using the "magic number"
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* approach to dividing by constants, including codegen instructions.
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* The unsigned division incorporates the "round down" optimization per
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* ridiculous_fish.
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*
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* This is free and unencumbered software. Any copyright is dedicated
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* to the Public Domain.''
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*/
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#include "fast_idiv_by_const.h"
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#include "u_math.h"
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#include "util/macros.h"
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#include <limits.h>
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#include <assert.h>
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struct util_fast_udiv_info
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util_compute_fast_udiv_info(uint64_t D, unsigned num_bits, unsigned UINT_BITS)
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{
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/* The numerator must fit in a uint64_t */
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assert(num_bits > 0 && num_bits <= UINT_BITS);
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assert(D != 0);
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/* The eventual result */
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struct util_fast_udiv_info result;
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if (util_is_power_of_two_or_zero64(D)) {
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unsigned div_shift = util_logbase2_64(D);
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if (div_shift) {
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/* Dividing by a power of two. */
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result.multiplier = 1ull << (UINT_BITS - div_shift);
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result.pre_shift = 0;
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result.post_shift = 0;
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result.increment = 0;
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return result;
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} else {
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/* Dividing by 1. */
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/* Assuming: floor((num + 1) * (2^32 - 1) / 2^32) = num */
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result.multiplier = u_uintN_max(UINT_BITS);
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result.pre_shift = 0;
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result.post_shift = 0;
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result.increment = 1;
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return result;
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}
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}
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/* The extra shift implicit in the difference between UINT_BITS and num_bits
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*/
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const unsigned extra_shift = UINT_BITS - num_bits;
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/* The initial power of 2 is one less than the first one that can possibly
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* work.
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*/
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const uint64_t initial_power_of_2 = (uint64_t)1 << (UINT_BITS-1);
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/* The remainder and quotient of our power of 2 divided by d */
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uint64_t quotient = initial_power_of_2 / D;
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uint64_t remainder = initial_power_of_2 % D;
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/* ceil(log_2 D) */
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unsigned ceil_log_2_D;
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/* The magic info for the variant "round down" algorithm */
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uint64_t down_multiplier = 0;
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unsigned down_exponent = 0;
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int has_magic_down = 0;
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/* Compute ceil(log_2 D) */
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ceil_log_2_D = 0;
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uint64_t tmp;
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for (tmp = D; tmp > 0; tmp >>= 1)
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ceil_log_2_D += 1;
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/* Begin a loop that increments the exponent, until we find a power of 2
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* that works.
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*/
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unsigned exponent;
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for (exponent = 0; ; exponent++) {
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/* Quotient and remainder is from previous exponent; compute it for this
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* exponent.
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*/
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if (remainder >= D - remainder) {
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/* Doubling remainder will wrap around D */
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quotient = quotient * 2 + 1;
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remainder = remainder * 2 - D;
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} else {
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/* Remainder will not wrap */
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quotient = quotient * 2;
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remainder = remainder * 2;
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}
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/* We're done if this exponent works for the round_up algorithm.
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* Note that exponent may be larger than the maximum shift supported,
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* so the check for >= ceil_log_2_D is critical.
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*/
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if ((exponent + extra_shift >= ceil_log_2_D) ||
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(D - remainder) <= ((uint64_t)1 << (exponent + extra_shift)))
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break;
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/* Set magic_down if we have not set it yet and this exponent works for
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* the round_down algorithm
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*/
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if (!has_magic_down &&
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remainder <= ((uint64_t)1 << (exponent + extra_shift))) {
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has_magic_down = 1;
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down_multiplier = quotient;
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down_exponent = exponent;
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}
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}
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if (exponent < ceil_log_2_D) {
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/* magic_up is efficient */
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result.multiplier = quotient + 1;
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result.pre_shift = 0;
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result.post_shift = exponent;
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result.increment = 0;
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} else if (D & 1) {
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/* Odd divisor, so use magic_down, which must have been set */
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assert(has_magic_down);
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result.multiplier = down_multiplier;
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result.pre_shift = 0;
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result.post_shift = down_exponent;
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result.increment = 1;
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} else {
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/* Even divisor, so use a prefix-shifted dividend */
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unsigned pre_shift = 0;
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uint64_t shifted_D = D;
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while ((shifted_D & 1) == 0) {
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shifted_D >>= 1;
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pre_shift += 1;
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}
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result = util_compute_fast_udiv_info(shifted_D, num_bits - pre_shift,
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UINT_BITS);
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/* expect no increment or pre_shift in this path */
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assert(result.increment == 0 && result.pre_shift == 0);
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result.pre_shift = pre_shift;
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}
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return result;
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}
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struct util_fast_sdiv_info
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util_compute_fast_sdiv_info(int64_t D, unsigned SINT_BITS)
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{
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/* D must not be zero. */
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assert(D != 0);
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/* The result is not correct for these divisors. */
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assert(D != 1 && D != -1);
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/* Our result */
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struct util_fast_sdiv_info result;
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/* Absolute value of D (we know D is not the most negative value since
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* that's a power of 2)
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*/
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const uint64_t abs_d = (D < 0 ? -D : D);
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/* The initial power of 2 is one less than the first one that can possibly
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* work */
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/* "two31" in Warren */
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unsigned exponent = SINT_BITS - 1;
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const uint64_t initial_power_of_2 = (uint64_t)1 << exponent;
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/* Compute the absolute value of our "test numerator,"
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* which is the largest dividend whose remainder with d is d-1.
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* This is called anc in Warren.
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*/
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const uint64_t tmp = initial_power_of_2 + (D < 0);
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const uint64_t abs_test_numer = tmp - 1 - tmp % abs_d;
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/* Initialize our quotients and remainders (q1, r1, q2, r2 in Warren) */
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uint64_t quotient1 = initial_power_of_2 / abs_test_numer;
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uint64_t remainder1 = initial_power_of_2 % abs_test_numer;
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uint64_t quotient2 = initial_power_of_2 / abs_d;
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uint64_t remainder2 = initial_power_of_2 % abs_d;
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uint64_t delta;
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/* Begin our loop */
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do {
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/* Update the exponent */
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exponent++;
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/* Update quotient1 and remainder1 */
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quotient1 *= 2;
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remainder1 *= 2;
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if (remainder1 >= abs_test_numer) {
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quotient1 += 1;
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remainder1 -= abs_test_numer;
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}
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/* Update quotient2 and remainder2 */
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quotient2 *= 2;
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remainder2 *= 2;
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if (remainder2 >= abs_d) {
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quotient2 += 1;
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remainder2 -= abs_d;
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}
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/* Keep going as long as (2**exponent) / abs_d <= delta */
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delta = abs_d - remainder2;
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} while (quotient1 < delta || (quotient1 == delta && remainder1 == 0));
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result.multiplier = util_sign_extend(quotient2 + 1, SINT_BITS);
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if (D < 0) result.multiplier = -result.multiplier;
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result.shift = exponent - SINT_BITS;
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return result;
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}
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