/* * License for Berkeley SoftFloat Release 3e * * John R. Hauser * 2018 January 20 * * The following applies to the whole of SoftFloat Release 3e as well as to * each source file individually. * * Copyright 2011, 2012, 2013, 2014, 2015, 2016, 2017, 2018 The Regents of the * University of California. All rights reserved. * * Redistribution and use in source and binary forms, with or without * modification, are permitted provided that the following conditions are met: * * 1. Redistributions of source code must retain the above copyright notice, * this list of conditions, and the following disclaimer. * * 2. Redistributions in binary form must reproduce the above copyright * notice, this list of conditions, and the following disclaimer in the * documentation and/or other materials provided with the distribution. * * 3. Neither the name of the University nor the names of its contributors * may be used to endorse or promote products derived from this software * without specific prior written permission. * * THIS SOFTWARE IS PROVIDED BY THE REGENTS AND CONTRIBUTORS "AS IS", AND ANY * EXPRESS OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE IMPLIED * WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE, ARE * DISCLAIMED. IN NO EVENT SHALL THE REGENTS OR CONTRIBUTORS BE LIABLE FOR ANY * DIRECT, INDIRECT, INCIDENTAL, SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES * (INCLUDING, BUT NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; * LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION) HOWEVER CAUSED AND * ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT, STRICT LIABILITY, OR TORT * (INCLUDING NEGLIGENCE OR OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF * THIS SOFTWARE, EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE. * * * The functions listed in this file are modified versions of the ones * from the Berkeley SoftFloat 3e Library. * * Their implementation correctness has been checked with the Berkeley * TestFloat Release 3e tool for x86_64. */ #include "rounding.h" #include "bitscan.h" #include "softfloat.h" #if defined(BIG_ENDIAN) #define word_incr -1 #define index_word(total, n) ((total) - 1 - (n)) #define index_word_hi(total) 0 #define index_word_lo(total) ((total) - 1) #define index_multiword_hi(total, n) 0 #define index_multiword_lo(total, n) ((total) - (n)) #define index_multiword_hi_but(total, n) 0 #define index_multiword_lo_but(total, n) (n) #else #define word_incr 1 #define index_word(total, n) (n) #define index_word_hi(total) ((total) - 1) #define index_word_lo(total) 0 #define index_multiword_hi(total, n) ((total) - (n)) #define index_multiword_lo(total, n) 0 #define index_multiword_hi_but(total, n) (n) #define index_multiword_lo_but(total, n) 0 #endif typedef union { double f; int64_t i; uint64_t u; } di_type; typedef union { float f; int32_t i; uint32_t u; } fi_type; const uint8_t count_leading_zeros8[256] = { 8, 7, 6, 6, 5, 5, 5, 5, 4, 4, 4, 4, 4, 4, 4, 4, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 3, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 2, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 1, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0, 0 }; /** * \brief Shifts 'a' right by the number of bits given in 'dist', which must be in * the range 1 to 63. If any nonzero bits are shifted off, they are "jammed" * into the least-significant bit of the shifted value by setting the * least-significant bit to 1. This shifted-and-jammed value is returned. * * From softfloat_shortShiftRightJam64() */ static inline uint64_t _mesa_short_shift_right_jam64(uint64_t a, uint8_t dist) { return a >> dist | ((a & (((uint64_t) 1 << dist) - 1)) != 0); } /** * \brief Shifts 'a' right by the number of bits given in 'dist', which must not * be zero. If any nonzero bits are shifted off, they are "jammed" into the * least-significant bit of the shifted value by setting the least-significant * bit to 1. This shifted-and-jammed value is returned. * The value of 'dist' can be arbitrarily large. In particular, if 'dist' is * greater than 64, the result will be either 0 or 1, depending on whether 'a' * is zero or nonzero. * * From softfloat_shiftRightJam64() */ static inline uint64_t _mesa_shift_right_jam64(uint64_t a, uint32_t dist) { return (dist < 63) ? a >> dist | ((uint64_t) (a << (-dist & 63)) != 0) : (a != 0); } /** * \brief Shifts 'a' right by the number of bits given in 'dist', which must not be * zero. If any nonzero bits are shifted off, they are "jammed" into the * least-significant bit of the shifted value by setting the least-significant * bit to 1. This shifted-and-jammed value is returned. * The value of 'dist' can be arbitrarily large. In particular, if 'dist' is * greater than 32, the result will be either 0 or 1, depending on whether 'a' * is zero or nonzero. * * From softfloat_shiftRightJam32() */ static inline uint32_t _mesa_shift_right_jam32(uint32_t a, uint16_t dist) { return (dist < 31) ? a >> dist | ((uint32_t) (a << (-dist & 31)) != 0) : (a != 0); } /** * \brief Extracted from softfloat_roundPackToF64() */ static inline double _mesa_roundtozero_f64(int64_t s, int64_t e, int64_t m) { di_type result; if ((uint64_t) e >= 0x7fd) { if (e < 0) { m = _mesa_shift_right_jam64(m, -e); e = 0; } else if ((e > 0x7fd) || (0x8000000000000000 <= m)) { e = 0x7ff; m = 0; result.u = (s << 63) + (e << 52) + m; result.u -= 1; return result.f; } } m >>= 10; if (m == 0) e = 0; result.u = (s << 63) + (e << 52) + m; return result.f; } /** * \brief Extracted from softfloat_roundPackToF32() */ static inline float _mesa_round_f32(int32_t s, int32_t e, int32_t m, bool rtz) { fi_type result; uint8_t round_increment = rtz ? 0 : 0x40; if ((uint32_t) e >= 0xfd) { if (e < 0) { m = _mesa_shift_right_jam32(m, -e); e = 0; } else if ((e > 0xfd) || (0x80000000 <= m + round_increment)) { e = 0xff; m = 0; result.u = (s << 31) + (e << 23) + m; result.u -= !round_increment; return result.f; } } uint8_t round_bits; round_bits = m & 0x7f; m = ((uint32_t) m + round_increment) >> 7; m &= ~(uint32_t) (! (round_bits ^ 0x40) & !rtz); if (m == 0) e = 0; result.u = (s << 31) + (e << 23) + m; return result.f; } /** * \brief Extracted from softfloat_roundPackToF16() */ static inline uint16_t _mesa_roundtozero_f16(int16_t s, int16_t e, int16_t m) { if ((uint16_t) e >= 0x1d) { if (e < 0) { m = _mesa_shift_right_jam32(m, -e); e = 0; } else if (e > 0x1d) { e = 0x1f; m = 0; return (s << 15) + (e << 10) + m - 1; } } m >>= 4; if (m == 0) e = 0; return (s << 15) + (e << 10) + m; } /** * \brief Shifts the N-bit unsigned integer pointed to by 'a' left by the number of * bits given in 'dist', where N = 'size_words' * 32. The value of 'dist' * must be in the range 1 to 31. Any nonzero bits shifted off are lost. The * shifted N-bit result is stored at the location pointed to by 'm_out'. Each * of 'a' and 'm_out' points to a 'size_words'-long array of 32-bit elements * that concatenate in the platform's normal endian order to form an N-bit * integer. * * From softfloat_shortShiftLeftM() */ static inline void _mesa_short_shift_left_m(uint8_t size_words, const uint32_t *a, uint8_t dist, uint32_t *m_out) { uint8_t neg_dist; unsigned index, last_index; uint32_t part_word, a_word; neg_dist = -dist; index = index_word_hi(size_words); last_index = index_word_lo(size_words); part_word = a[index] << dist; while (index != last_index) { a_word = a[index - word_incr]; m_out[index] = part_word | a_word >> (neg_dist & 31); index -= word_incr; part_word = a_word << dist; } m_out[index] = part_word; } /** * \brief Shifts the N-bit unsigned integer pointed to by 'a' left by the number of * bits given in 'dist', where N = 'size_words' * 32. The value of 'dist' * must not be zero. Any nonzero bits shifted off are lost. The shifted * N-bit result is stored at the location pointed to by 'm_out'. Each of 'a' * and 'm_out' points to a 'size_words'-long array of 32-bit elements that * concatenate in the platform's normal endian order to form an N-bit * integer. The value of 'dist' can be arbitrarily large. In particular, if * 'dist' is greater than N, the stored result will be 0. * * From softfloat_shiftLeftM() */ static inline void _mesa_shift_left_m(uint8_t size_words, const uint32_t *a, uint32_t dist, uint32_t *m_out) { uint32_t word_dist; uint8_t inner_dist; uint8_t i; word_dist = dist >> 5; if (word_dist < size_words) { a += index_multiword_lo_but(size_words, word_dist); inner_dist = dist & 31; if (inner_dist) { _mesa_short_shift_left_m(size_words - word_dist, a, inner_dist, m_out + index_multiword_hi_but(size_words, word_dist)); if (!word_dist) return; } else { uint32_t *dest = m_out + index_word_hi(size_words); a += index_word_hi(size_words - word_dist); for (i = size_words - word_dist; i; --i) { *dest = *a; a -= word_incr; dest -= word_incr; } } m_out += index_multiword_lo(size_words, word_dist); } else { word_dist = size_words; } do { *m_out++ = 0; --word_dist; } while (word_dist); } /** * \brief Shifts the N-bit unsigned integer pointed to by 'a' right by the number of * bits given in 'dist', where N = 'size_words' * 32. The value of 'dist' * must be in the range 1 to 31. Any nonzero bits shifted off are lost. The * shifted N-bit result is stored at the location pointed to by 'm_out'. Each * of 'a' and 'm_out' points to a 'size_words'-long array of 32-bit elements * that concatenate in the platform's normal endian order to form an N-bit * integer. * * From softfloat_shortShiftRightM() */ static inline void _mesa_short_shift_right_m(uint8_t size_words, const uint32_t *a, uint8_t dist, uint32_t *m_out) { uint8_t neg_dist; unsigned index, last_index; uint32_t part_word, a_word; neg_dist = -dist; index = index_word_lo(size_words); last_index = index_word_hi(size_words); part_word = a[index] >> dist; while (index != last_index) { a_word = a[index + word_incr]; m_out[index] = a_word << (neg_dist & 31) | part_word; index += word_incr; part_word = a_word >> dist; } m_out[index] = part_word; } /** * \brief Shifts the N-bit unsigned integer pointed to by 'a' right by the number of * bits given in 'dist', where N = 'size_words' * 32. The value of 'dist' * must be in the range 1 to 31. If any nonzero bits are shifted off, they * are "jammed" into the least-significant bit of the shifted value by setting * the least-significant bit to 1. This shifted-and-jammed N-bit result is * stored at the location pointed to by 'm_out'. Each of 'a' and 'm_out' * points to a 'size_words'-long array of 32-bit elements that concatenate in * the platform's normal endian order to form an N-bit integer. * * * From softfloat_shortShiftRightJamM() */ static inline void _mesa_short_shift_right_jam_m(uint8_t size_words, const uint32_t *a, uint8_t dist, uint32_t *m_out) { uint8_t neg_dist; unsigned index, last_index; uint64_t part_word, a_word; neg_dist = -dist; index = index_word_lo(size_words); last_index = index_word_hi(size_words); a_word = a[index]; part_word = a_word >> dist; if (part_word << dist != a_word ) part_word |= 1; while (index != last_index) { a_word = a[index + word_incr]; m_out[index] = a_word << (neg_dist & 31) | part_word; index += word_incr; part_word = a_word >> dist; } m_out[index] = part_word; } /** * \brief Shifts the N-bit unsigned integer pointed to by 'a' right by the number of * bits given in 'dist', where N = 'size_words' * 32. The value of 'dist' * must not be zero. If any nonzero bits are shifted off, they are "jammed" * into the least-significant bit of the shifted value by setting the * least-significant bit to 1. This shifted-and-jammed N-bit result is stored * at the location pointed to by 'm_out'. Each of 'a' and 'm_out' points to a * 'size_words'-long array of 32-bit elements that concatenate in the * platform's normal endian order to form an N-bit integer. The value of * 'dist' can be arbitrarily large. In particular, if 'dist' is greater than * N, the stored result will be either 0 or 1, depending on whether the * original N bits are all zeros. * * From softfloat_shiftRightJamM() */ static inline void _mesa_shift_right_jam_m(uint8_t size_words, const uint32_t *a, uint32_t dist, uint32_t *m_out) { uint32_t word_jam, word_dist, *tmp; uint8_t i, inner_dist; word_jam = 0; word_dist = dist >> 5; tmp = NULL; if (word_dist) { if (size_words < word_dist) word_dist = size_words; tmp = (uint32_t *) (a + index_multiword_lo(size_words, word_dist)); i = word_dist; do { word_jam = *tmp++; if (word_jam) break; --i; } while (i); tmp = m_out; } if (word_dist < size_words) { a += index_multiword_hi_but(size_words, word_dist); inner_dist = dist & 31; if (inner_dist) { _mesa_short_shift_right_jam_m(size_words - word_dist, a, inner_dist, m_out + index_multiword_lo_but(size_words, word_dist)); if (!word_dist) { if (word_jam) m_out[index_word_lo(size_words)] |= 1; return; } } else { a += index_word_lo(size_words - word_dist); tmp = m_out + index_word_lo(size_words); for (i = size_words - word_dist; i; --i) { *tmp = *a; a += word_incr; tmp += word_incr; } } tmp = m_out + index_multiword_hi(size_words, word_dist); } if (tmp) { do { *tmp++ = 0; --word_dist; } while (word_dist); } if (word_jam) m_out[index_word_lo(size_words)] |= 1; } /** * \brief Calculate a + b but rounding to zero. * * Notice that this mainly differs from the original Berkeley SoftFloat 3e * implementation in that we don't really treat NaNs, Zeroes nor the * signalling flags. Any NaN is good for us and the sign of the Zero is not * important. * * From f64_add() */ double _mesa_double_add_rtz(double a, double b) { const di_type a_di = {a}; uint64_t a_flt_m = a_di.u & 0x0fffffffffffff; uint64_t a_flt_e = (a_di.u >> 52) & 0x7ff; uint64_t a_flt_s = (a_di.u >> 63) & 0x1; const di_type b_di = {b}; uint64_t b_flt_m = b_di.u & 0x0fffffffffffff; uint64_t b_flt_e = (b_di.u >> 52) & 0x7ff; uint64_t b_flt_s = (b_di.u >> 63) & 0x1; int64_t s, e, m = 0; s = a_flt_s; const int64_t exp_diff = a_flt_e - b_flt_e; /* Handle special cases */ if (a_flt_s != b_flt_s) { return _mesa_double_sub_rtz(a, -b); } else if ((a_flt_e == 0) && (a_flt_m == 0)) { /* 'a' is zero, return 'b' */ return b; } else if ((b_flt_e == 0) && (b_flt_m == 0)) { /* 'b' is zero, return 'a' */ return a; } else if (a_flt_e == 0x7ff && a_flt_m != 0) { /* 'a' is a NaN, return NaN */ return a; } else if (b_flt_e == 0x7ff && b_flt_m != 0) { /* 'b' is a NaN, return NaN */ return b; } else if (a_flt_e == 0x7ff && a_flt_m == 0) { /* Inf + x = Inf */ return a; } else if (b_flt_e == 0x7ff && b_flt_m == 0) { /* x + Inf = Inf */ return b; } else if (exp_diff == 0 && a_flt_e == 0) { di_type result_di; result_di.u = a_di.u + b_flt_m; return result_di.f; } else if (exp_diff == 0) { e = a_flt_e; m = 0x0020000000000000 + a_flt_m + b_flt_m; m <<= 9; } else if (exp_diff < 0) { a_flt_m <<= 9; b_flt_m <<= 9; e = b_flt_e; if (a_flt_e != 0) a_flt_m += 0x2000000000000000; else a_flt_m <<= 1; a_flt_m = _mesa_shift_right_jam64(a_flt_m, -exp_diff); m = 0x2000000000000000 + a_flt_m + b_flt_m; if (m < 0x4000000000000000) { --e; m <<= 1; } } else { a_flt_m <<= 9; b_flt_m <<= 9; e = a_flt_e; if (b_flt_e != 0) b_flt_m += 0x2000000000000000; else b_flt_m <<= 1; b_flt_m = _mesa_shift_right_jam64(b_flt_m, exp_diff); m = 0x2000000000000000 + a_flt_m + b_flt_m; if (m < 0x4000000000000000) { --e; m <<= 1; } } return _mesa_roundtozero_f64(s, e, m); } /** * \brief Returns the number of leading 0 bits before the most-significant 1 bit of * 'a'. If 'a' is zero, 64 is returned. */ static inline unsigned _mesa_count_leading_zeros64(uint64_t a) { return 64 - util_last_bit64(a); } /** * \brief Returns the number of leading 0 bits before the most-significant 1 bit of * 'a'. If 'a' is zero, 32 is returned. */ static inline unsigned _mesa_count_leading_zeros32(uint32_t a) { return 32 - util_last_bit(a); } static inline double _mesa_norm_round_pack_f64(int64_t s, int64_t e, int64_t m) { int8_t shift_dist; shift_dist = _mesa_count_leading_zeros64(m) - 1; e -= shift_dist; if ((10 <= shift_dist) && ((unsigned) e < 0x7fd)) { di_type result; result.u = (s << 63) + ((m ? e : 0) << 52) + (m << (shift_dist - 10)); return result.f; } else { return _mesa_roundtozero_f64(s, e, m << shift_dist); } } /** * \brief Replaces the N-bit unsigned integer pointed to by 'm_out' by the * 2s-complement of itself, where N = 'size_words' * 32. Argument 'm_out' * points to a 'size_words'-long array of 32-bit elements that concatenate in * the platform's normal endian order to form an N-bit integer. * * From softfloat_negXM() */ static inline void _mesa_neg_x_m(uint8_t size_words, uint32_t *m_out) { unsigned index, last_index; uint8_t carry; uint32_t word; index = index_word_lo(size_words); last_index = index_word_hi(size_words); carry = 1; for (;;) { word = ~m_out[index] + carry; m_out[index] = word; if (index == last_index) break; index += word_incr; if (word) carry = 0; } } /** * \brief Adds the two N-bit integers pointed to by 'a' and 'b', where N = * 'size_words' * 32. The addition is modulo 2^N, so any carry out is * lost. The N-bit sum is stored at the location pointed to by 'm_out'. Each * of 'a', 'b', and 'm_out' points to a 'size_words'-long array of 32-bit * elements that concatenate in the platform's normal endian order to form an * N-bit integer. * * From softfloat_addM() */ static inline void _mesa_add_m(uint8_t size_words, const uint32_t *a, const uint32_t *b, uint32_t *m_out) { unsigned index, last_index; uint8_t carry; uint32_t a_word, word; index = index_word_lo(size_words); last_index = index_word_hi(size_words); carry = 0; for (;;) { a_word = a[index]; word = a_word + b[index] + carry; m_out[index] = word; if (index == last_index) break; if (word != a_word) carry = (word < a_word); index += word_incr; } } /** * \brief Subtracts the two N-bit integers pointed to by 'a' and 'b', where N = * 'size_words' * 32. The subtraction is modulo 2^N, so any borrow out (carry * out) is lost. The N-bit difference is stored at the location pointed to by * 'm_out'. Each of 'a', 'b', and 'm_out' points to a 'size_words'-long array * of 32-bit elements that concatenate in the platform's normal endian order * to form an N-bit integer. * * From softfloat_subM() */ static inline void _mesa_sub_m(uint8_t size_words, const uint32_t *a, const uint32_t *b, uint32_t *m_out) { unsigned index, last_index; uint8_t borrow; uint32_t a_word, b_word; index = index_word_lo(size_words); last_index = index_word_hi(size_words); borrow = 0; for (;;) { a_word = a[index]; b_word = b[index]; m_out[index] = a_word - b_word - borrow; if (index == last_index) break; borrow = borrow ? (a_word <= b_word) : (a_word < b_word); index += word_incr; } } /* Calculate a - b but rounding to zero. * * Notice that this mainly differs from the original Berkeley SoftFloat 3e * implementation in that we don't really treat NaNs, Zeroes nor the * signalling flags. Any NaN is good for us and the sign of the Zero is not * important. * * From f64_sub() */ double _mesa_double_sub_rtz(double a, double b) { const di_type a_di = {a}; uint64_t a_flt_m = a_di.u & 0x0fffffffffffff; uint64_t a_flt_e = (a_di.u >> 52) & 0x7ff; uint64_t a_flt_s = (a_di.u >> 63) & 0x1; const di_type b_di = {b}; uint64_t b_flt_m = b_di.u & 0x0fffffffffffff; uint64_t b_flt_e = (b_di.u >> 52) & 0x7ff; uint64_t b_flt_s = (b_di.u >> 63) & 0x1; int64_t s, e, m = 0; int64_t m_diff = 0; unsigned shift_dist = 0; s = a_flt_s; const int64_t exp_diff = a_flt_e - b_flt_e; /* Handle special cases */ if (a_flt_s != b_flt_s) { return _mesa_double_add_rtz(a, -b); } else if ((a_flt_e == 0) && (a_flt_m == 0)) { /* 'a' is zero, return '-b' */ return -b; } else if ((b_flt_e == 0) && (b_flt_m == 0)) { /* 'b' is zero, return 'a' */ return a; } else if (a_flt_e == 0x7ff && a_flt_m != 0) { /* 'a' is a NaN, return NaN */ return a; } else if (b_flt_e == 0x7ff && b_flt_m != 0) { /* 'b' is a NaN, return NaN */ return b; } else if (a_flt_e == 0x7ff && a_flt_m == 0) { if (b_flt_e == 0x7ff && b_flt_m == 0) { /* Inf - Inf = NaN */ di_type result; e = 0x7ff; result.u = (s << 63) + (e << 52) + 0x1; return result.f; } /* Inf - x = Inf */ return a; } else if (b_flt_e == 0x7ff && b_flt_m == 0) { /* x - Inf = -Inf */ return -b; } else if (exp_diff == 0) { m_diff = a_flt_m - b_flt_m; if (m_diff == 0) return 0; if (a_flt_e) --a_flt_e; if (m_diff < 0) { s = !s; m_diff = -m_diff; } shift_dist = _mesa_count_leading_zeros64(m_diff) - 11; e = a_flt_e - shift_dist; if (e < 0) { shift_dist = a_flt_e; e = 0; } di_type result; result.u = (s << 63) + (e << 52) + (m_diff << shift_dist); return result.f; } else if (exp_diff < 0) { a_flt_m <<= 10; b_flt_m <<= 10; s = !s; a_flt_m += (a_flt_e) ? 0x4000000000000000 : a_flt_m; a_flt_m = _mesa_shift_right_jam64(a_flt_m, -exp_diff); b_flt_m |= 0x4000000000000000; e = b_flt_e; m = b_flt_m - a_flt_m; } else { a_flt_m <<= 10; b_flt_m <<= 10; b_flt_m += (b_flt_e) ? 0x4000000000000000 : b_flt_m; b_flt_m = _mesa_shift_right_jam64(b_flt_m, exp_diff); a_flt_m |= 0x4000000000000000; e = a_flt_e; m = a_flt_m - b_flt_m; } return _mesa_norm_round_pack_f64(s, e - 1, m); } static inline void _mesa_norm_subnormal_mantissa_f64(uint64_t m, uint64_t *exp, uint64_t *m_out) { int shift_dist; shift_dist = _mesa_count_leading_zeros64(m) - 11; *exp = 1 - shift_dist; *m_out = m << shift_dist; } static inline void _mesa_norm_subnormal_mantissa_f32(uint32_t m, uint32_t *exp, uint32_t *m_out) { int shift_dist; shift_dist = _mesa_count_leading_zeros32(m) - 8; *exp = 1 - shift_dist; *m_out = m << shift_dist; } /** * \brief Multiplies 'a' and 'b' and stores the 128-bit product at the location * pointed to by 'zPtr'. Argument 'zPtr' points to an array of four 32-bit * elements that concatenate in the platform's normal endian order to form a * 128-bit integer. * * From softfloat_mul64To128M() */ static inline void _mesa_softfloat_mul_f64_to_f128_m(uint64_t a, uint64_t b, uint32_t *m_out) { uint32_t a32, a0, b32, b0; uint64_t z0, mid1, z64, mid; a32 = a >> 32; a0 = a; b32 = b >> 32; b0 = b; z0 = (uint64_t) a0 * b0; mid1 = (uint64_t) a32 * b0; mid = mid1 + (uint64_t) a0 * b32; z64 = (uint64_t) a32 * b32; z64 += (uint64_t) (mid < mid1) << 32 | mid >> 32; mid <<= 32; z0 += mid; m_out[index_word(4, 1)] = z0 >> 32; m_out[index_word(4, 0)] = z0; z64 += (z0 < mid); m_out[index_word(4, 3)] = z64 >> 32; m_out[index_word(4, 2)] = z64; } /* Calculate a * b but rounding to zero. * * Notice that this mainly differs from the original Berkeley SoftFloat 3e * implementation in that we don't really treat NaNs, Zeroes nor the * signalling flags. Any NaN is good for us and the sign of the Zero is not * important. * * From f64_mul() */ double _mesa_double_mul_rtz(double a, double b) { const di_type a_di = {a}; uint64_t a_flt_m = a_di.u & 0x0fffffffffffff; uint64_t a_flt_e = (a_di.u >> 52) & 0x7ff; uint64_t a_flt_s = (a_di.u >> 63) & 0x1; const di_type b_di = {b}; uint64_t b_flt_m = b_di.u & 0x0fffffffffffff; uint64_t b_flt_e = (b_di.u >> 52) & 0x7ff; uint64_t b_flt_s = (b_di.u >> 63) & 0x1; int64_t s, e, m = 0; s = a_flt_s ^ b_flt_s; if (a_flt_e == 0x7ff) { if (a_flt_m != 0) { /* 'a' is a NaN, return NaN */ return a; } else if (b_flt_e == 0x7ff && b_flt_m != 0) { /* 'b' is a NaN, return NaN */ return b; } if (!(b_flt_e | b_flt_m)) { /* Inf * 0 = NaN */ di_type result; e = 0x7ff; result.u = (s << 63) + (e << 52) + 0x1; return result.f; } /* Inf * x = Inf */ di_type result; e = 0x7ff; result.u = (s << 63) + (e << 52) + 0; return result.f; } if (b_flt_e == 0x7ff) { if (b_flt_m != 0) { /* 'b' is a NaN, return NaN */ return b; } if (!(a_flt_e | a_flt_m)) { /* 0 * Inf = NaN */ di_type result; e = 0x7ff; result.u = (s << 63) + (e << 52) + 0x1; return result.f; } /* x * Inf = Inf */ di_type result; e = 0x7ff; result.u = (s << 63) + (e << 52) + 0; return result.f; } if (a_flt_e == 0) { if (a_flt_m == 0) { /* 'a' is zero. Return zero */ di_type result; result.u = (s << 63) + 0; return result.f; } _mesa_norm_subnormal_mantissa_f64(a_flt_m , &a_flt_e, &a_flt_m); } if (b_flt_e == 0) { if (b_flt_m == 0) { /* 'b' is zero. Return zero */ di_type result; result.u = (s << 63) + 0; return result.f; } _mesa_norm_subnormal_mantissa_f64(b_flt_m , &b_flt_e, &b_flt_m); } e = a_flt_e + b_flt_e - 0x3ff; a_flt_m = (a_flt_m | 0x0010000000000000) << 10; b_flt_m = (b_flt_m | 0x0010000000000000) << 11; uint32_t m_128[4]; _mesa_softfloat_mul_f64_to_f128_m(a_flt_m, b_flt_m, m_128); m = (uint64_t) m_128[index_word(4, 3)] << 32 | m_128[index_word(4, 2)]; if (m_128[index_word(4, 1)] || m_128[index_word(4, 0)]) m |= 1; if (m < 0x4000000000000000) { --e; m <<= 1; } return _mesa_roundtozero_f64(s, e, m); } /** * \brief Calculate a * b + c but rounding to zero. * * Notice that this mainly differs from the original Berkeley SoftFloat 3e * implementation in that we don't really treat NaNs, Zeroes nor the * signalling flags. Any NaN is good for us and the sign of the Zero is not * important. * * From f64_mulAdd() */ double _mesa_double_fma_rtz(double a, double b, double c) { const di_type a_di = {a}; uint64_t a_flt_m = a_di.u & 0x0fffffffffffff; uint64_t a_flt_e = (a_di.u >> 52) & 0x7ff; uint64_t a_flt_s = (a_di.u >> 63) & 0x1; const di_type b_di = {b}; uint64_t b_flt_m = b_di.u & 0x0fffffffffffff; uint64_t b_flt_e = (b_di.u >> 52) & 0x7ff; uint64_t b_flt_s = (b_di.u >> 63) & 0x1; const di_type c_di = {c}; uint64_t c_flt_m = c_di.u & 0x0fffffffffffff; uint64_t c_flt_e = (c_di.u >> 52) & 0x7ff; uint64_t c_flt_s = (c_di.u >> 63) & 0x1; int64_t s, e, m = 0; c_flt_s ^= 0; s = a_flt_s ^ b_flt_s ^ 0; if (a_flt_e == 0x7ff) { if (a_flt_m != 0) { /* 'a' is a NaN, return NaN */ return a; } else if (b_flt_e == 0x7ff && b_flt_m != 0) { /* 'b' is a NaN, return NaN */ return b; } else if (c_flt_e == 0x7ff && c_flt_m != 0) { /* 'c' is a NaN, return NaN */ return c; } if (!(b_flt_e | b_flt_m)) { /* Inf * 0 + y = NaN */ di_type result; e = 0x7ff; result.u = (s << 63) + (e << 52) + 0x1; return result.f; } if ((c_flt_e == 0x7ff && c_flt_m == 0) && (s != c_flt_s)) { /* Inf * x - Inf = NaN */ di_type result; e = 0x7ff; result.u = (s << 63) + (e << 52) + 0x1; return result.f; } /* Inf * x + y = Inf */ di_type result; e = 0x7ff; result.u = (s << 63) + (e << 52) + 0; return result.f; } if (b_flt_e == 0x7ff) { if (b_flt_m != 0) { /* 'b' is a NaN, return NaN */ return b; } else if (c_flt_e == 0x7ff && c_flt_m != 0) { /* 'c' is a NaN, return NaN */ return c; } if (!(a_flt_e | a_flt_m)) { /* 0 * Inf + y = NaN */ di_type result; e = 0x7ff; result.u = (s << 63) + (e << 52) + 0x1; return result.f; } if ((c_flt_e == 0x7ff && c_flt_m == 0) && (s != c_flt_s)) { /* x * Inf - Inf = NaN */ di_type result; e = 0x7ff; result.u = (s << 63) + (e << 52) + 0x1; return result.f; } /* x * Inf + y = Inf */ di_type result; e = 0x7ff; result.u = (s << 63) + (e << 52) + 0; return result.f; } if (c_flt_e == 0x7ff) { if (c_flt_m != 0) { /* 'c' is a NaN, return NaN */ return c; } /* x * y + Inf = Inf */ return c; } if (a_flt_e == 0) { if (a_flt_m == 0) { /* 'a' is zero, return 'c' */ return c; } _mesa_norm_subnormal_mantissa_f64(a_flt_m , &a_flt_e, &a_flt_m); } if (b_flt_e == 0) { if (b_flt_m == 0) { /* 'b' is zero, return 'c' */ return c; } _mesa_norm_subnormal_mantissa_f64(b_flt_m , &b_flt_e, &b_flt_m); } e = a_flt_e + b_flt_e - 0x3fe; a_flt_m = (a_flt_m | 0x0010000000000000) << 10; b_flt_m = (b_flt_m | 0x0010000000000000) << 11; uint32_t m_128[4]; _mesa_softfloat_mul_f64_to_f128_m(a_flt_m, b_flt_m, m_128); m = (uint64_t) m_128[index_word(4, 3)] << 32 | m_128[index_word(4, 2)]; int64_t shift_dist = 0; if (!(m & 0x4000000000000000)) { --e; shift_dist = -1; } if (c_flt_e == 0) { if (c_flt_m == 0) { /* 'c' is zero, return 'a * b' */ if (shift_dist) m <<= 1; if (m_128[index_word(4, 1)] || m_128[index_word(4, 0)]) m |= 1; return _mesa_roundtozero_f64(s, e - 1, m); } _mesa_norm_subnormal_mantissa_f64(c_flt_m , &c_flt_e, &c_flt_m); } c_flt_m = (c_flt_m | 0x0010000000000000) << 10; uint32_t c_flt_m_128[4]; int64_t exp_diff = e - c_flt_e; if (exp_diff < 0) { e = c_flt_e; if ((s == c_flt_s) || (exp_diff < -1)) { shift_dist -= exp_diff; if (shift_dist) { m = _mesa_shift_right_jam64(m, shift_dist); } } else { if (!shift_dist) { _mesa_short_shift_right_m(4, m_128, 1, m_128); } } } else { if (shift_dist) _mesa_add_m(4, m_128, m_128, m_128); if (!exp_diff) { m = (uint64_t) m_128[index_word(4, 3)] << 32 | m_128[index_word(4, 2)]; } else { c_flt_m_128[index_word(4, 3)] = c_flt_m >> 32; c_flt_m_128[index_word(4, 2)] = c_flt_m; c_flt_m_128[index_word(4, 1)] = 0; c_flt_m_128[index_word(4, 0)] = 0; _mesa_shift_right_jam_m(4, c_flt_m_128, exp_diff, c_flt_m_128); } } if (s == c_flt_s) { if (exp_diff <= 0) { m += c_flt_m; } else { _mesa_add_m(4, m_128, c_flt_m_128, m_128); m = (uint64_t) m_128[index_word(4, 3)] << 32 | m_128[index_word(4, 2)]; } if (m & 0x8000000000000000) { e++; m = _mesa_short_shift_right_jam64(m, 1); } } else { if (exp_diff < 0) { s = c_flt_s; if (exp_diff < -1) { m = c_flt_m - m; if (m_128[index_word(4, 1)] || m_128[index_word(4, 0)]) { m = (m - 1) | 1; } if (!(m & 0x4000000000000000)) { --e; m <<= 1; } return _mesa_roundtozero_f64(s, e - 1, m); } else { c_flt_m_128[index_word(4, 3)] = c_flt_m >> 32; c_flt_m_128[index_word(4, 2)] = c_flt_m; c_flt_m_128[index_word(4, 1)] = 0; c_flt_m_128[index_word(4, 0)] = 0; _mesa_sub_m(4, c_flt_m_128, m_128, m_128); } } else if (!exp_diff) { m -= c_flt_m; if (!m && !m_128[index_word(4, 1)] && !m_128[index_word(4, 0)]) { /* Return zero */ di_type result; result.u = (s << 63) + 0; return result.f; } m_128[index_word(4, 3)] = m >> 32; m_128[index_word(4, 2)] = m; if (m & 0x8000000000000000) { s = !s; _mesa_neg_x_m(4, m_128); } } else { _mesa_sub_m(4, m_128, c_flt_m_128, m_128); if (1 < exp_diff) { m = (uint64_t) m_128[index_word(4, 3)] << 32 | m_128[index_word(4, 2)]; if (!(m & 0x4000000000000000)) { --e; m <<= 1; } if (m_128[index_word(4, 1)] || m_128[index_word(4, 0)]) m |= 1; return _mesa_roundtozero_f64(s, e - 1, m); } } shift_dist = 0; m = (uint64_t) m_128[index_word(4, 3)] << 32 | m_128[index_word(4, 2)]; if (!m) { shift_dist = 64; m = (uint64_t) m_128[index_word(4, 1)] << 32 | m_128[index_word(4, 0)]; } shift_dist += _mesa_count_leading_zeros64(m) - 1; if (shift_dist) { e -= shift_dist; _mesa_shift_left_m(4, m_128, shift_dist, m_128); m = (uint64_t) m_128[index_word(4, 3)] << 32 | m_128[index_word(4, 2)]; } } if (m_128[index_word(4, 1)] || m_128[index_word(4, 0)]) m |= 1; return _mesa_roundtozero_f64(s, e - 1, m); } /** * \brief Calculate a * b + c but rounding to zero. * * Notice that this mainly differs from the original Berkeley SoftFloat 3e * implementation in that we don't really treat NaNs, Zeroes nor the * signalling flags. Any NaN is good for us and the sign of the Zero is not * important. * * From f32_mulAdd() */ float _mesa_float_fma_rtz(float a, float b, float c) { const fi_type a_fi = {a}; uint32_t a_flt_m = a_fi.u & 0x07fffff; uint32_t a_flt_e = (a_fi.u >> 23) & 0xff; uint32_t a_flt_s = (a_fi.u >> 31) & 0x1; const fi_type b_fi = {b}; uint32_t b_flt_m = b_fi.u & 0x07fffff; uint32_t b_flt_e = (b_fi.u >> 23) & 0xff; uint32_t b_flt_s = (b_fi.u >> 31) & 0x1; const fi_type c_fi = {c}; uint32_t c_flt_m = c_fi.u & 0x07fffff; uint32_t c_flt_e = (c_fi.u >> 23) & 0xff; uint32_t c_flt_s = (c_fi.u >> 31) & 0x1; int32_t s, e, m = 0; c_flt_s ^= 0; s = a_flt_s ^ b_flt_s ^ 0; if (a_flt_e == 0xff) { if (a_flt_m != 0) { /* 'a' is a NaN, return NaN */ return a; } else if (b_flt_e == 0xff && b_flt_m != 0) { /* 'b' is a NaN, return NaN */ return b; } else if (c_flt_e == 0xff && c_flt_m != 0) { /* 'c' is a NaN, return NaN */ return c; } if (!(b_flt_e | b_flt_m)) { /* Inf * 0 + y = NaN */ fi_type result; e = 0xff; result.u = (s << 31) + (e << 23) + 0x1; return result.f; } if ((c_flt_e == 0xff && c_flt_m == 0) && (s != c_flt_s)) { /* Inf * x - Inf = NaN */ fi_type result; e = 0xff; result.u = (s << 31) + (e << 23) + 0x1; return result.f; } /* Inf * x + y = Inf */ fi_type result; e = 0xff; result.u = (s << 31) + (e << 23) + 0; return result.f; } if (b_flt_e == 0xff) { if (b_flt_m != 0) { /* 'b' is a NaN, return NaN */ return b; } else if (c_flt_e == 0xff && c_flt_m != 0) { /* 'c' is a NaN, return NaN */ return c; } if (!(a_flt_e | a_flt_m)) { /* 0 * Inf + y = NaN */ fi_type result; e = 0xff; result.u = (s << 31) + (e << 23) + 0x1; return result.f; } if ((c_flt_e == 0xff && c_flt_m == 0) && (s != c_flt_s)) { /* x * Inf - Inf = NaN */ fi_type result; e = 0xff; result.u = (s << 31) + (e << 23) + 0x1; return result.f; } /* x * Inf + y = Inf */ fi_type result; e = 0xff; result.u = (s << 31) + (e << 23) + 0; return result.f; } if (c_flt_e == 0xff) { if (c_flt_m != 0) { /* 'c' is a NaN, return NaN */ return c; } /* x * y + Inf = Inf */ return c; } if (a_flt_e == 0) { if (a_flt_m == 0) { /* 'a' is zero, return 'c' */ return c; } _mesa_norm_subnormal_mantissa_f32(a_flt_m , &a_flt_e, &a_flt_m); } if (b_flt_e == 0) { if (b_flt_m == 0) { /* 'b' is zero, return 'c' */ return c; } _mesa_norm_subnormal_mantissa_f32(b_flt_m , &b_flt_e, &b_flt_m); } e = a_flt_e + b_flt_e - 0x7e; a_flt_m = (a_flt_m | 0x00800000) << 7; b_flt_m = (b_flt_m | 0x00800000) << 7; uint64_t m_64 = (uint64_t) a_flt_m * b_flt_m; if (m_64 < 0x2000000000000000) { --e; m_64 <<= 1; } if (c_flt_e == 0) { if (c_flt_m == 0) { /* 'c' is zero, return 'a * b' */ m = _mesa_short_shift_right_jam64(m_64, 31); return _mesa_round_f32(s, e - 1, m, true); } _mesa_norm_subnormal_mantissa_f32(c_flt_m , &c_flt_e, &c_flt_m); } c_flt_m = (c_flt_m | 0x00800000) << 6; int16_t exp_diff = e - c_flt_e; if (s == c_flt_s) { if (exp_diff <= 0) { e = c_flt_e; m = c_flt_m + _mesa_shift_right_jam64(m_64, 32 - exp_diff); } else { m_64 += _mesa_shift_right_jam64((uint64_t) c_flt_m << 32, exp_diff); m = _mesa_short_shift_right_jam64(m_64, 32); } if (m < 0x40000000) { --e; m <<= 1; } } else { uint64_t c_flt_m_64 = (uint64_t) c_flt_m << 32; if (exp_diff < 0) { s = c_flt_s; e = c_flt_e; m_64 = c_flt_m_64 - _mesa_shift_right_jam64(m_64, -exp_diff); } else if (!exp_diff) { m_64 -= c_flt_m_64; if (!m_64) { /* Return zero */ fi_type result; result.u = (s << 31) + 0; return result.f; } if (m_64 & 0x8000000000000000) { s = !s; m_64 = -m_64; } } else { m_64 -= _mesa_shift_right_jam64(c_flt_m_64, exp_diff); } int8_t shift_dist = _mesa_count_leading_zeros64(m_64) - 1; e -= shift_dist; shift_dist -= 32; if (shift_dist < 0) { m = _mesa_short_shift_right_jam64(m_64, -shift_dist); } else { m = (uint32_t) m_64 << shift_dist; } } return _mesa_round_f32(s, e, m, true); } /** * \brief Converts from 64bits to 32bits float and rounds according to * instructed. * * From f64_to_f32() */ float _mesa_double_to_f32(double val, bool rtz) { const di_type di = {val}; uint64_t flt_m = di.u & 0x0fffffffffffff; uint64_t flt_e = (di.u >> 52) & 0x7ff; uint64_t flt_s = (di.u >> 63) & 0x1; int32_t s, e, m = 0; s = flt_s; if (flt_e == 0x7ff) { if (flt_m != 0) { /* 'val' is a NaN, return NaN */ fi_type result; e = 0xff; m = 0x1; result.u = (s << 31) + (e << 23) + m; return result.f; } /* 'val' is Inf, return Inf */ fi_type result; e = 0xff; result.u = (s << 31) + (e << 23) + m; return result.f; } if (!(flt_e | flt_m)) { /* 'val' is zero, return zero */ fi_type result; e = 0; result.u = (s << 31) + (e << 23) + m; return result.f; } m = _mesa_short_shift_right_jam64(flt_m, 22); if ( ! (flt_e | m) ) { /* 'val' is denorm, return zero */ fi_type result; e = 0; result.u = (s << 31) + (e << 23) + m; return result.f; } return _mesa_round_f32(s, flt_e - 0x381, m | 0x40000000, rtz); } /** * \brief Converts from 32bits to 16bits float and rounds the result to zero. * * From f32_to_f16() */ uint16_t _mesa_float_to_half_rtz_slow(float val) { const fi_type fi = {val}; const uint32_t flt_m = fi.u & 0x7fffff; const uint32_t flt_e = (fi.u >> 23) & 0xff; const uint32_t flt_s = (fi.u >> 31) & 0x1; int16_t s, e, m = 0; s = flt_s; if (flt_e == 0xff) { if (flt_m != 0) { /* 'val' is a NaN, return NaN */ e = 0x1f; m = 0x1; return (s << 15) + (e << 10) + m; } /* 'val' is Inf, return Inf */ e = 0x1f; return (s << 15) + (e << 10) + m; } if (!(flt_e | flt_m)) { /* 'val' is zero, return zero */ e = 0; return (s << 15) + (e << 10) + m; } m = flt_m >> 9 | ((flt_m & 0x1ff) != 0); if ( ! (flt_e | m) ) { /* 'val' is denorm, return zero */ e = 0; return (s << 15) + (e << 10) + m; } return _mesa_roundtozero_f16(s, flt_e - 0x71, m | 0x4000); }