| blob | a5671b2865bd10db1d26bfa02cc592aa109a43e2 |
1 /* real.c - software floating point emulation.
2 Copyright (C) 1993-2017 Free Software Foundation, Inc.
3 Contributed by Stephen L. Moshier (moshier@world.std.com).
4 Re-written by Richard Henderson <rth@redhat.com>
6 This file is part of GCC.
8 GCC is free software; you can redistribute it and/or modify it under
9 the terms of the GNU General Public License as published by the Free
10 Software Foundation; either version 3, or (at your option) any later
11 version.
13 GCC is distributed in the hope that it will be useful, but WITHOUT ANY
14 WARRANTY; without even the implied warranty of MERCHANTABILITY or
15 FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License
16 for more details.
18 You should have received a copy of the GNU General Public License
19 along with GCC; see the file COPYING3. If not see
20 <http://www.gnu.org/licenses/>. */
31 /* The floating point model used internally is not exactly IEEE 754
32 compliant, and close to the description in the ISO C99 standard,
33 section 5.2.4.2.2 Characteristics of floating types.
35 Specifically
37 x = s * b^e * \sum_{k=1}^p f_k * b^{-k}
39 where
40 s = sign (+- 1)
41 b = base or radix, here always 2
42 e = exponent
43 p = precision (the number of base-b digits in the significand)
44 f_k = the digits of the significand.
46 We differ from typical IEEE 754 encodings in that the entire
47 significand is fractional. Normalized significands are in the
48 range [0.5, 1.0).
50 A requirement of the model is that P be larger than the largest
51 supported target floating-point type by at least 2 bits. This gives
52 us proper rounding when we truncate to the target type. In addition,
53 E must be large enough to hold the smallest supported denormal number
54 in a normalized form.
56 Both of these requirements are easily satisfied. The largest target
57 significand is 113 bits; we store at least 160. The smallest
58 denormal number fits in 17 exponent bits; we store 26. */
61 /* Used to classify two numbers simultaneously. */
62 #define CLASS2(A, B) ((A) << 2 | (B))
64 #if HOST_BITS_PER_LONG != 64 && HOST_BITS_PER_LONG != 32
66 #endif
114 \f
115 /* Initialize R with a positive zero. */
119 {
122 }
124 /* Initialize R with the canonical quiet NaN. */
128 {
133 }
137 {
143 }
147 {
151 }
153 \f
154 /* Right-shift the significand of A by N bits; put the result in the
155 significand of R. If any one bits are shifted out, return true. */
157 static bool
160 {
165 {
169 }
172 {
175 {
180 }
181 }
182 else
183 {
188 }
191 }
193 /* Right-shift the significand of A by N bits; put the result in the
194 significand of R. */
196 static void
199 {
204 {
206 {
211 }
212 }
213 else
214 {
219 }
220 }
222 /* Left-shift the significand of A by N bits; put the result in the
223 significand of R. */
225 static void
228 {
233 {
238 }
239 else
241 {
246 }
247 }
249 /* Likewise, but N is specialized to 1. */
253 {
259 }
261 /* Add the significands of A and B, placing the result in R. Return
262 true if there was carry out of the most significant word. */
267 {
272 {
277 {
280 }
281 else
285 }
288 }
290 /* Subtract the significands of A and B, placing the result in R. CARRY is
291 true if there's a borrow incoming to the least significant word.
292 Return true if there was borrow out of the most significant word. */
297 {
301 {
306 {
309 }
310 else
314 }
317 }
319 /* Negate the significand A, placing the result in R. */
323 {
328 {
332 {
334 {
337 }
338 else
340 }
341 else
345 }
346 }
348 /* Compare significands. Return tri-state vs zero. */
352 {
356 {
364 }
367 }
369 /* Return true if A is nonzero. */
373 {
381 }
383 /* Set bit N of the significand of R. */
387 {
390 }
392 /* Clear bit N of the significand of R. */
396 {
399 }
401 /* Test bit N of the significand of R. */
405 {
406 /* ??? Compiler bug here if we return this expression directly.
407 The conversion to bool strips the "&1" and we wind up testing
408 e.g. 2 != 0 -> true. Seen in gcc version 3.2 20020520. */
411 }
413 /* Clear bits 0..N-1 of the significand of R. */
415 static void
417 {
424 }
426 /* Divide the significands of A and B, placing the result in R. Return
427 true if the division was inexact. */
432 {
433 REAL_VALUE_TYPE u;
442 do
443 {
446 start:
448 {
451 }
452 }
459 }
461 /* Adjust the exponent and significand of R such that the most
462 significant bit is set. We underflow to zero and overflow to
463 infinity here, without denormals. (The intermediate representation
464 exponent is large enough to handle target denormals normalized.) */
466 static void
468 {
475 /* Find the first word that is nonzero. */
479 else
482 /* Zero significand flushes to zero. */
484 {
488 }
490 /* Find the first bit that is nonzero. */
497 {
503 else
504 {
507 }
508 }
509 }
510 \f
511 /* Calculate R = A + (SUBTRACT_P ? -B : B). Return true if the
512 result may be inexact due to a loss of precision. */
514 static bool
517 {
519 REAL_VALUE_TYPE t;
522 /* Determine if we need to add or subtract. */
527 {
529 /* -0 + -0 = -0, -0 - +0 = -0; all other cases yield +0. */
536 /* 0 + ANY = ANY. */
540 /* ANY + NaN = NaN. */
542 /* R + Inf = Inf. */
544 /* Make resulting NaN value to be qNaN. The caller has the
545 responsibility to avoid the operation if flag_signaling_nans
546 is on. */
554 /* ANY + 0 = ANY. */
557 /* NaN + ANY = NaN. */
559 /* Inf + R = Inf. */
561 /* Make resulting NaN value to be qNaN. The caller has the
562 responsibility to avoid the operation if flag_signaling_nans
563 is on. */
569 /* Inf - Inf = NaN. */
571 else
572 /* Inf + Inf = Inf. */
581 }
583 /* Swap the arguments such that A has the larger exponent. */
586 {
591 }
594 /* If the exponents are not identical, we need to shift the
595 significand of B down. */
597 {
598 /* If the exponents are too far apart, the significands
599 do not overlap, which makes the subtraction a noop. */
601 {
605 }
609 }
612 {
614 {
615 /* We got a borrow out of the subtraction. That means that
616 A and B had the same exponent, and B had the larger
617 significand. We need to swap the sign and negate the
618 significand. */
621 }
622 }
623 else
624 {
626 {
627 /* We got carry out of the addition. This means we need to
628 shift the significand back down one bit and increase the
629 exponent. */
633 {
636 }
637 }
638 }
643 /* Zero out the remaining fields. */
648 /* Re-normalize the result. */
651 /* Special case: if the subtraction results in zero, the result
652 is positive. */
655 else
659 }
661 /* Calculate R = A * B. Return true if the result may be inexact. */
663 static bool
666 {
673 {
677 /* +-0 * ANY = 0 with appropriate sign. */
685 /* ANY * NaN = NaN. */
687 /* Make resulting NaN value to be qNaN. The caller has the
688 responsibility to avoid the operation if flag_signaling_nans
689 is on. */
697 /* NaN * ANY = NaN. */
699 /* Make resulting NaN value to be qNaN. The caller has the
700 responsibility to avoid the operation if flag_signaling_nans
701 is on. */
708 /* 0 * Inf = NaN */
715 /* Inf * Inf = Inf, R * Inf = Inf */
724 }
728 else
732 /* Collect all the partial products. Since we don't have sure access
733 to a widening multiply, we split each long into two half-words.
735 Consider the long-hand form of a four half-word multiplication:
737 A B C D
738 * E F G H
739 --------------
740 DE DF DG DH
741 CE CF CG CH
742 BE BF BG BH
743 AE AF AG AH
745 We construct partial products of the widened half-word products
746 that are known to not overlap, e.g. DF+DH. Each such partial
747 product is given its proper exponent, which allows us to sum them
748 and obtain the finished product. */
751 {
755 else
762 {
767 {
770 }
772 {
773 /* Would underflow to zero, which we shouldn't bother adding. */
776 }
783 {
787 else
791 }
795 }
796 }
803 }
805 /* Calculate R = A / B. Return true if the result may be inexact. */
807 static bool
810 {
816 {
818 /* 0 / 0 = NaN. */
820 /* Inf / Inf = NaN. */
826 /* 0 / ANY = 0. */
828 /* R / Inf = 0. */
833 /* R / 0 = Inf. */
835 /* Inf / 0 = Inf. */
843 /* ANY / NaN = NaN. */
845 /* Make resulting NaN value to be qNaN. The caller has the
846 responsibility to avoid the operation if flag_signaling_nans
847 is on. */
855 /* NaN / ANY = NaN. */
857 /* Make resulting NaN value to be qNaN. The caller has the
858 responsibility to avoid the operation if flag_signaling_nans
859 is on. */
865 /* Inf / R = Inf. */
874 }
878 else
881 /* Make sure all fields in the result are initialized. */
888 {
891 }
893 {
896 }
901 /* Re-normalize the result. */
909 }
911 /* Return a tri-state comparison of A vs B. Return NAN_RESULT if
912 one of the two operands is a NaN. */
914 static int
917 {
921 {
923 /* Sign of zero doesn't matter for compares. */
927 /* Decimal float zero is special and uses rvc_normal, not rvc_zero. */
930 /* Fall through. */
939 /* Decimal float zero is special and uses rvc_normal, not rvc_zero. */
942 /* Fall through. */
961 }
973 else
977 }
979 /* Return A truncated to an integral value toward zero. */
981 static void
983 {
987 {
991 /* Make resulting NaN value to be qNaN. The caller has the
992 responsibility to avoid the operation if flag_signaling_nans
993 is on. */
999 {
1002 }
1011 }
1012 }
1014 /* Perform the binary or unary operation described by CODE.
1015 For a unary operation, leave OP1 NULL. This function returns
1016 true if the result may be inexact due to loss of precision. */
1018 bool
1021 {
1028 {
1030 /* Clear any padding areas in *r if it isn't equal to one of the
1031 operands so that we can later do bitwise comparisons later on. */
1053 {
1055 /* Make resulting NaN value to be qNaN. The caller has the
1056 responsibility to avoid the operation if flag_signaling_nans
1057 is on. */
1059 }
1062 else
1068 {
1070 /* Make resulting NaN value to be qNaN. The caller has the
1071 responsibility to avoid the operation if flag_signaling_nans
1072 is on. */
1074 }
1077 else
1097 }
1099 }
1101 REAL_VALUE_TYPE
1103 {
1104 REAL_VALUE_TYPE r;
1107 }
1109 REAL_VALUE_TYPE
1111 {
1112 REAL_VALUE_TYPE r;
1115 }
1117 /* Return whether OP0 == OP1. */
1119 bool
1121 {
1123 }
1125 /* Return whether OP0 < OP1. */
1127 bool
1129 {
1131 }
1133 bool
1136 {
1140 {
1172 }
1173 }
1175 /* Return floor log2(R). */
1177 int
1179 {
1181 {
1191 }
1192 }
1194 /* R = OP0 * 2**EXP. */
1196 void
1198 {
1201 {
1205 /* Make resulting NaN value to be qNaN. The caller has the
1206 responsibility to avoid the operation if flag_signaling_nans
1207 is on. */
1217 else
1223 }
1224 }
1226 /* Determine whether a floating-point value X is infinite. */
1228 bool
1230 {
1232 }
1234 /* Determine whether a floating-point value X is a NaN. */
1236 bool
1238 {
1240 }
1242 /* Determine whether a floating-point value X is a signaling NaN. */
1244 {
1246 }
1248 /* Determine whether a floating-point value X is finite. */
1250 bool
1252 {
1254 }
1256 /* Determine whether a floating-point value X is negative. */
1258 bool
1260 {
1262 }
1264 /* Determine whether a floating-point value X is minus zero. */
1266 bool
1268 {
1270 }
1272 /* Compare two floating-point objects for bitwise identity. */
1274 bool
1276 {
1285 {
1300 /* The significand is ignored for canonical NaNs. */
1307 }
1314 }
1316 /* Try to change R into its exact multiplicative inverse in format FMT.
1317 Return true if successful. */
1319 bool
1321 {
1323 REAL_VALUE_TYPE u;
1329 /* Check for a power of two: all significand bits zero except the MSB. */
1336 /* Find the inverse and truncate to the required format. */
1340 /* The rounding may have overflowed. */
1351 }
1353 /* Return true if arithmetic on values in IMODE that were promoted
1354 from values in TMODE is equivalent to direct arithmetic on values
1355 in TMODE. */
1357 bool
1359 {
1363 /* These conditions are conservative rather than trying to catch the
1364 exact boundary conditions; the main case to allow is IEEE float
1365 and double. */
1380 }
1381 \f
1382 /* Render R as an integer. */
1384 HOST_WIDE_INT
1386 {
1390 {
1392 underflow:
1397 overflow:
1400 i--;
1409 /* Only force overflow for unsigned overflow. Signed overflow is
1410 undefined, so it doesn't matter what we return, and some callers
1411 expect to be able to use this routine for both signed and
1412 unsigned conversions. */
1418 else
1419 {
1424 }
1434 }
1435 }
1437 /* Likewise, but producing a wide-int of PRECISION. If the value cannot
1438 be represented in precision, *FAIL is set to TRUE. */
1440 wide_int
1442 {
1446 wide_int result;
1449 {
1451 underflow:
1456 overflow:
1461 else
1471 /* Only force overflow for unsigned overflow. Signed overflow is
1472 undefined, so it doesn't matter what we return, and some callers
1473 expect to be able to use this routine for both signed and
1474 unsigned conversions. */
1478 /* Put the significand into a wide_int that has precision W, which
1479 is the smallest HWI-multiple that has at least PRECISION bits.
1480 This ensures that the top bit of the significand is in the
1481 top bit of the wide_int. */
1485 #if (HOST_BITS_PER_WIDE_INT == HOST_BITS_PER_LONG)
1487 {
1490 }
1491 #else
1494 {
1498 else
1503 }
1504 #endif
1505 /* Shift the value into place and truncate to the desired precision. */
1512 else
1517 }
1518 }
1520 /* A subroutine of real_to_decimal. Compute the quotient and remainder
1521 of NUM / DEN. Return the quotient and place the remainder in NUM.
1522 It is expected that NUM / DEN are close enough that the quotient is
1523 small. */
1525 static unsigned long
1527 {
1536 do
1537 {
1541 start:
1543 {
1546 }
1547 }
1554 }
1556 /* Render R as a decimal floating point constant. Emit DIGITS significant
1557 digits in the result, bounded by BUF_SIZE. If DIGITS is 0, choose the
1558 maximum for the representation. If CROP_TRAILING_ZEROS, strip trailing
1559 zeros. If MODE is VOIDmode, round to nearest value. Otherwise, round
1560 to a string that, when parsed back in mode MODE, yields the same value. */
1562 #define M_LOG10_2 0.30102999566398119521
1564 void
1568 {
1579 {
1582 }
1586 {
1596 /* ??? Print the significand as well, if not canonical? */
1602 }
1605 {
1608 }
1610 /* Bound the number of digits printed by the size of the representation. */
1615 /* Estimate the decimal exponent, and compute the length of the string it
1616 will print as. Be conservative and add one to account for possible
1617 overflow or rounding error. */
1622 /* Bound the number of digits printed by the size of the output buffer. */
1639 {
1642 /* Number is greater than one. Convert significand to an integer
1643 and strip trailing decimal zeros. */
1648 /* Largest M, such that 10**2**M fits within SIGNIFICAND_BITS. */
1651 /* Iterate over the bits of the possible powers of 10 that might
1652 be present in U and eliminate them. That is, if we find that
1653 10**2**M divides U evenly, keep the division and increase
1654 DEC_EXP by 2**M. */
1655 do
1656 {
1657 REAL_VALUE_TYPE t;
1662 {
1665 }
1666 }
1669 /* Revert the scaling to integer that we performed earlier. */
1674 /* Find power of 10. Do this by dividing out 10**2**M when
1675 this is larger than the current remainder. Fill PTEN with
1676 the power of 10 that we compute. */
1678 {
1680 do
1681 {
1684 {
1688 }
1689 }
1691 }
1692 else
1693 /* We managed to divide off enough tens in the above reduction
1694 loop that we've now got a negative exponent. Fall into the
1695 less-than-one code to compute the proper value for PTEN. */
1697 }
1699 {
1702 /* Number is less than one. Pad significand with leading
1703 decimal zeros. */
1707 {
1708 /* Stop if we'd shift bits off the bottom. */
1714 /* Stop if we're now >= 1. */
1720 }
1723 /* Find power of 10. Do this by multiplying in P=10**2**M when
1724 the current remainder is smaller than 1/P. Fill PTEN with the
1725 power of 10 that we compute. */
1727 do
1728 {
1733 {
1737 }
1738 }
1741 /* Invert the positive power of 10 that we've collected so far. */
1743 }
1750 /* At this point, PTEN should contain the nearest power of 10 smaller
1751 than R, such that this division produces the first digit.
1753 Using a divide-step primitive that returns the complete integral
1754 remainder avoids the rounding error that would be produced if
1755 we were to use do_divide here and then simply multiply by 10 for
1756 each subsequent digit. */
1760 /* Be prepared for error in that division via underflow ... */
1762 {
1763 /* Multiply by 10 and try again. */
1768 }
1770 /* ... or overflow. */
1772 {
1777 }
1778 else
1779 {
1782 }
1784 /* Generate subsequent digits. */
1786 {
1790 }
1793 /* Generate one more digit with which to do rounding. */
1797 /* Round the result. */
1799 {
1800 /* If the format uses round towards zero when parsing the string
1801 back in, we need to always round away from zero here. */
1803 digit++;
1805 }
1806 else
1807 {
1809 {
1810 /* Round to nearest. If R is nonzero there are additional
1811 nonzero digits to be extracted. */
1813 digit++;
1814 /* Round to even. */
1816 digit++;
1817 }
1820 }
1823 {
1825 {
1829 else
1830 {
1833 }
1834 }
1836 /* Carry out of the first digit. This means we had all 9's and
1837 now have all 0's. "Prepend" a 1 by overwriting the first 0. */
1839 {
1841 dec_exp++;
1842 }
1843 }
1845 /* Insert the decimal point. */
1849 /* If requested, drop trailing zeros. Never crop past "1.0". */
1852 last--;
1854 /* Append the exponent. */
1857 /* Verify that we can read the original value back in. */
1859 {
1863 }
1864 }
1866 /* Likewise, except always uses round-to-nearest. */
1868 void
1871 {
1874 }
1876 /* Render R as a hexadecimal floating point constant. Emit DIGITS
1877 significant digits in the result, bounded by BUF_SIZE. If DIGITS is 0,
1878 choose the maximum for the representation. If CROP_TRAILING_ZEROS,
1879 strip trailing zeros. */
1881 void
1884 {
1891 {
1901 /* ??? Print the significand as well, if not canonical? */
1907 }
1910 {
1911 /* Hexadecimal format for decimal floats is not interesting. */
1914 }
1919 /* Bound the number of digits printed by the size of the output buffer. */
1938 {
1942 }
1944 out:
1947 p--;
1950 }
1952 /* Initialize R from a decimal or hexadecimal string. The string is
1953 assumed to have been syntax checked already. Return -1 if the
1954 value underflows, +1 if overflows, and 0 otherwise. */
1956 int
1958 {
1965 {
1967 str++;
1968 }
1970 str++;
1973 {
1976 }
1978 {
1981 }
1983 {
1986 }
1989 {
1990 /* Hexadecimal floating point. */
1996 str++;
1998 {
2003 {
2007 }
2009 /* Ensure correct rounding by setting last bit if there is
2010 a subsequent nonzero digit. */
2013 str++;
2014 }
2016 {
2017 str++;
2019 {
2022 }
2024 {
2029 {
2033 }
2035 /* Ensure correct rounding by setting last bit if there is
2036 a subsequent nonzero digit. */
2038 str++;
2039 }
2040 }
2042 /* If the mantissa is zero, ignore the exponent. */
2047 {
2050 str++;
2052 {
2054 str++;
2055 }
2057 str++;
2061 {
2065 {
2066 /* Overflowed the exponent. */
2069 else
2071 }
2072 str++;
2073 }
2078 }
2084 }
2085 else
2086 {
2087 /* Decimal floating point. */
2089 mpfr_t m;
2093 cstr++;
2095 {
2096 cstr++;
2098 cstr++;
2099 }
2101 /* If the mantissa is zero, ignore the exponent. */
2105 /* Nonzero value, possibly overflowing or underflowing. */
2108 /* The result should never be a NaN, and because the rounding is
2109 toward zero should never be an infinity. */
2112 {
2115 }
2117 {
2120 }
2121 else
2122 {
2124 /* 1 to 3 bits may have been shifted off (with a sticky bit)
2125 because the hex digits used in real_from_mpfr did not
2126 start with a digit 8 to f, but the exponent bounds above
2127 should have avoided underflow or overflow. */
2129 /* Set a sticky bit if mpfr_strtofr was inexact. */
2132 }
2133 }
2138 is_a_zero:
2142 underflow:
2146 overflow:
2149 }
2151 /* Legacy. Similar, but return the result directly. */
2153 REAL_VALUE_TYPE
2155 {
2156 REAL_VALUE_TYPE r;
2163 }
2165 /* Initialize R from string S and desired format FMT. */
2167 void
2169 {
2172 else
2177 }
2179 /* Initialize R from the wide_int VAL_IN. Round it to format FMT if
2180 FMT is nonnull. */
2182 void
2185 {
2188 else
2189 {
2200 /* We have to ensure we can negate the largest negative number. */
2206 /* Ensure a multiple of HOST_BITS_PER_WIDE_INT, ceiling, as elt
2207 won't work with precisions that are not a multiple of
2208 HOST_BITS_PER_WIDE_INT. */
2211 /* Ensure we can represent the largest negative number. */
2216 /* Cap the size to the size allowed by real.h. */
2218 {
2219 HOST_WIDE_INT cnt_l_z;
2223 {
2226 /* This value is too large, we must shift it right to
2227 preserve all the bits we can, and then bump the
2228 exponent up by that amount. */
2230 }
2232 }
2234 /* Clear out top bits so elt will work with precisions that aren't
2235 a multiple of HOST_BITS_PER_WIDE_INT. */
2244 {
2248 }
2249 else
2250 {
2253 {
2261 }
2262 }
2265 }
2271 }
2273 /* Render R, an integral value, as a floating point constant with no
2274 specified exponent. */
2276 static void
2279 {
2288 {
2291 }
2311 {
2315 }
2318 }
2320 /* Convert a real with an integral value to decimal float. */
2322 static void
2324 {
2329 }
2331 /* Returns 10**2**N. */
2335 {
2342 {
2344 {
2352 }
2353 else
2354 {
2357 }
2358 }
2361 }
2363 /* Returns 10**(-2**N). */
2367 {
2377 }
2379 /* Returns N. */
2383 {
2393 }
2395 /* Multiply R by 10**EXP. */
2397 static void
2399 {
2405 {
2409 }
2410 else
2419 }
2421 /* Returns the special REAL_VALUE_TYPE corresponding to 'e'. */
2425 {
2428 /* Initialize mathematical constants for constant folding builtins.
2429 These constants need to be given to at least 160 bits precision. */
2431 {
2432 mpfr_t m;
2439 }
2441 }
2443 /* Returns a cached REAL_VALUE_TYPE corresponding to 1/n, for various n. */
2445 #define CACHED_FRACTION(NAME, N) \
2446 const REAL_VALUE_TYPE * \
2447 NAME (void) \
2448 { \
2449 static REAL_VALUE_TYPE value; \
2450 \
2451 /* Initialize mathematical constants for constant folding builtins. \
2452 These constants need to be given to at least 160 bits \
2454 if (value.cl == rvc_zero) \
2455 real_arithmetic (&value, RDIV_EXPR, &dconst1, real_digit (N)); \
2456 return &value; \
2457 }
2464 /* Returns the special REAL_VALUE_TYPE corresponding to sqrt(2). */
2468 {
2471 /* Initialize mathematical constants for constant folding builtins.
2472 These constants need to be given to at least 160 bits precision. */
2474 {
2475 mpfr_t m;
2480 }
2482 }
2484 /* Fills R with +Inf. */
2486 void
2488 {
2490 }
2492 /* Fills R with a NaN whose significand is described by STR. If QUIET,
2493 we force a QNaN, else we force an SNaN. The string, if not empty,
2494 is parsed as a number and placed in the significand. Return true
2495 if the string was successfully parsed. */
2497 bool
2499 format_helper fmt)
2500 {
2502 {
2505 else
2507 }
2508 else
2509 {
2515 /* Parse akin to strtol into the significand of R. */
2518 str++;
2520 str++;
2522 str++;
2524 {
2525 str++;
2527 {
2529 str++;
2530 }
2531 else
2533 }
2536 {
2537 REAL_VALUE_TYPE u;
2540 {
2554 }
2560 str++;
2561 }
2563 /* Must have consumed the entire string for success. */
2567 /* Shift the significand into place such that the bits
2568 are in the most significant bits for the format. */
2571 /* Our MSB is always unset for NaNs. */
2574 /* Force quiet or signaling NaN. */
2576 }
2579 }
2581 /* Fills R with the largest finite value representable in mode MODE.
2582 If SIGN is nonzero, R is set to the most negative finite value. */
2584 void
2586 {
2596 else
2597 {
2607 /* This is an IBM extended double format made up of two IEEE
2608 doubles. The value of the long double is the sum of the
2609 values of the two parts. The most significant part is
2610 required to be the value of the long double rounded to the
2611 nearest double. Rounding means we need a slightly smaller
2612 value for LDBL_MAX. */
2614 }
2615 }
2617 /* Fills R with 2**N. */
2619 void
2621 {
2624 n++;
2628 ;
2629 else
2630 {
2634 }
2637 }
2639 \f
2640 static void
2642 {
2648 {
2650 {
2653 }
2654 /* FIXME. We can come here via fp_easy_constant
2655 (e.g. -O0 on '_Decimal32 x = 1.0 + 2.0dd'), but have not
2656 investigated whether this convert needs to be here, or
2657 something else is missing. */
2659 }
2667 {
2668 underflow:
2670 /* FALLTHRU */
2676 overflow:
2690 }
2692 /* Check the range of the exponent. If we're out of range,
2693 either underflow or overflow. */
2697 {
2701 {
2702 /* Don't underflow completely until we've had a chance to round. */
2705 }
2706 else
2707 {
2712 /* De-normalize the significand. */
2715 }
2716 }
2719 {
2720 /* There are P2 true significand bits, followed by one guard bit,
2721 followed by one sticky bit, followed by stuff. Fold nonzero
2722 stuff into the sticky bit. */
2735 /* Round to even. */
2737 }
2740 {
2741 REAL_VALUE_TYPE u;
2746 {
2747 /* Overflow. Means the significand had been all ones, and
2748 is now all zeros. Need to increase the exponent, and
2749 possibly re-normalize it. */
2754 }
2755 }
2757 /* Catch underflow that we deferred until after rounding. */
2761 /* Clear out trailing garbage. */
2763 }
2765 /* Extend or truncate to a new format. */
2767 void
2770 {
2778 /* Make resulting NaN value to be qNaN. The caller has the
2779 responsibility to avoid the operation if flag_signaling_nans
2780 is on. */
2784 /* round_for_format de-normalizes denormals. Undo just that part. */
2787 }
2789 /* Legacy. Likewise, except return the struct directly. */
2791 REAL_VALUE_TYPE
2793 {
2794 REAL_VALUE_TYPE r;
2797 }
2799 /* Return true if truncating to FMT is exact. */
2801 bool
2803 {
2804 REAL_VALUE_TYPE t;
2807 /* Don't allow conversion to denormals. */
2812 /* After conversion to the new format, the value must be identical. */
2815 }
2817 /* Write R to the given target format. Place the words of the result
2818 in target word order in BUF. There are always 32 bits in each
2819 long, no matter the size of the host long.
2821 Legacy: return word 0 for implementing REAL_VALUE_TO_TARGET_SINGLE. */
2823 long
2825 format_helper fmt)
2826 {
2827 REAL_VALUE_TYPE r;
2838 }
2840 /* Read R from the given target format. Read the words of the result
2841 in target word order in BUF. There are always 32 bits in each
2842 long, no matter the size of the host long. */
2844 void
2846 {
2848 }
2850 /* Return the number of bits of the largest binary value that the
2851 significand of FMT will hold. */
2852 /* ??? Legacy. Should get access to real_format directly. */
2854 int
2856 {
2861 {
2862 /* Return the size in bits of the largest binary value that can be
2863 held by the decimal coefficient for this format. This is one more
2864 than the number of bits required to hold the largest coefficient
2865 of this format. */
2868 }
2870 }
2872 /* Return a hash value for the given real value. */
2873 /* ??? The "unsigned int" return value is intended to be hashval_t,
2874 but I didn't want to pull hashtab.h into real.h. */
2876 unsigned int
2878 {
2884 {
2902 }
2906 {
2909 }
2910 else
2915 }
2916 \f
2917 /* IEEE single-precision format. */
2924 static void
2927 {
2936 {
2943 else
2949 {
2954 else
2961 }
2962 else
2967 /* Recall that IEEE numbers are interpreted as 1.F x 2**exp,
2968 whereas the intermediate representation is 0.F x 2**exp.
2969 Which means we're off by one. */
2972 else
2980 }
2983 }
2985 static void
2988 {
2998 {
3000 {
3006 }
3009 }
3011 {
3013 {
3019 }
3020 else
3021 {
3024 }
3025 }
3026 else
3027 {
3032 }
3033 }
3036 {
3037 encode_ieee_single,
3038 decode_ieee_single,
3055 "ieee_single"
3056 };
3059 {
3060 encode_ieee_single,
3061 decode_ieee_single,
3078 "mips_single"
3079 };
3082 {
3083 encode_ieee_single,
3084 decode_ieee_single,
3101 "motorola_single"
3102 };
3104 /* SPU Single Precision (Extended-Range Mode) format is the same as IEEE
3105 single precision with the following differences:
3106 - Infinities are not supported. Instead MAX_FLOAT or MIN_FLOAT
3107 are generated.
3108 - NaNs are not supported.
3109 - The range of non-zero numbers in binary is
3110 (001)[1.]000...000 to (255)[1.]111...111.
3111 - Denormals can be represented, but are treated as +0.0 when
3112 used as an operand and are never generated as a result.
3113 - -0.0 can be represented, but a zero result is always +0.0.
3114 - the only supported rounding mode is trunction (towards zero). */
3116 {
3117 encode_ieee_single,
3118 decode_ieee_single,
3135 "spu_single"
3136 };
3137 \f
3138 /* IEEE double-precision format. */
3145 static void
3148 {
3156 {
3160 }
3161 else
3162 {
3167 }
3170 {
3177 else
3178 {
3181 }
3186 {
3188 {
3190 {
3193 }
3194 else
3195 {
3198 }
3199 }
3202 else
3210 }
3211 else
3212 {
3215 }
3219 /* Recall that IEEE numbers are interpreted as 1.F x 2**exp,
3220 whereas the intermediate representation is 0.F x 2**exp.
3221 Which means we're off by one. */
3224 else
3233 }
3237 else
3239 }
3241 static void
3244 {
3251 else
3267 {
3269 {
3274 {
3279 }
3280 else
3281 {
3284 }
3286 }
3289 }
3291 {
3293 {
3298 {
3301 }
3302 else
3304 }
3305 else
3306 {
3309 }
3310 }
3311 else
3312 {
3317 {
3320 }
3321 else
3323 }
3324 }
3327 {
3328 encode_ieee_double,
3329 decode_ieee_double,
3346 "ieee_double"
3347 };
3350 {
3351 encode_ieee_double,
3352 decode_ieee_double,
3369 "mips_double"
3370 };
3373 {
3374 encode_ieee_double,
3375 decode_ieee_double,
3392 "motorola_double"
3393 };
3394 \f
3395 /* IEEE extended real format. This comes in three flavors: Intel's as
3396 a 12 byte image, Intel's as a 16 byte image, and Motorola's. Intel
3397 12- and 16-byte images may be big- or little endian; Motorola's is
3398 always big endian. */
3400 /* Helper subroutine which converts from the internal format to the
3401 12-byte little-endian Intel format. Functions below adjust this
3402 for the other possible formats. */
3403 static void
3406 {
3414 {
3420 {
3423 /* Intel requires the explicit integer bit to be set, otherwise
3424 it considers the value a "pseudo-infinity". Motorola docs
3425 say it doesn't care. */
3427 }
3428 else
3429 {
3432 }
3437 {
3440 {
3442 {
3445 }
3446 }
3448 {
3451 }
3452 else
3453 {
3457 }
3460 else
3465 /* Intel requires the explicit integer bit to be set, otherwise
3466 it considers the value a "pseudo-nan". Motorola docs say it
3467 doesn't care. */
3469 }
3470 else
3471 {
3474 }
3478 {
3481 /* Recall that IEEE numbers are interpreted as 1.F x 2**exp,
3482 whereas the intermediate representation is 0.F x 2**exp.
3483 Which means we're off by one.
3485 Except for Motorola, which consider exp=0 and explicit
3486 integer bit set to continue to be normalized. In theory
3487 this discrepancy has been taken care of by the difference
3488 in fmt->emin in round_for_format. */
3492 else
3493 {
3496 }
3500 {
3503 }
3504 else
3505 {
3509 }
3510 }
3515 }
3518 }
3520 /* Convert from the internal format to the 12-byte Motorola format
3521 for an IEEE extended real. */
3522 static void
3525 {
3530 /* For infinity clear the explicit integer bit again, so that the
3531 format matches the canonical infinity generated by the FPU. */
3534 /* Motorola chips are assumed always to be big-endian. Also, the
3535 padding in a Motorola extended real goes between the exponent and
3536 the mantissa. At this point the mantissa is entirely within
3537 elements 0 and 1 of intermed, and the exponent entirely within
3538 element 2, so all we have to do is swap the order around, and
3539 shift element 2 left 16 bits. */
3543 }
3545 /* Convert from the internal format to the 12-byte Intel format for
3546 an IEEE extended real. */
3547 static void
3550 {
3552 {
3553 /* All the padding in an Intel-format extended real goes at the high
3554 end, which in this case is after the mantissa, not the exponent.
3555 Therefore we must shift everything down 16 bits. */
3561 }
3562 else
3563 /* encode_ieee_extended produces what we want directly. */
3565 }
3567 /* Convert from the internal format to the 16-byte Intel format for
3568 an IEEE extended real. */
3569 static void
3572 {
3573 /* All the padding in an Intel-format extended real goes at the high end. */
3576 }
3578 /* As above, we have a helper function which converts from 12-byte
3579 little-endian Intel format to internal format. Functions below
3580 adjust for the other possible formats. */
3581 static void
3584 {
3600 {
3602 {
3606 /* When the IEEE format contains a hidden bit, we know that
3607 it's zero at this point, and so shift up the significand
3608 and decrease the exponent to match. In this case, Motorola
3609 defines the explicit integer bit to be valid, so we don't
3610 know whether the msb is set or not. */
3613 {
3616 }
3617 else
3621 }
3624 }
3626 {
3627 /* See above re "pseudo-infinities" and "pseudo-nans".
3628 Short summary is that the MSB will likely always be
3629 set, and that we don't care about it. */
3633 {
3638 {
3641 }
3642 else
3644 }
3645 else
3646 {
3649 }
3650 }
3651 else
3652 {
3657 {
3660 }
3661 else
3663 }
3664 }
3666 /* Convert from the internal format to the 12-byte Motorola format
3667 for an IEEE extended real. */
3668 static void
3671 {
3674 /* Motorola chips are assumed always to be big-endian. Also, the
3675 padding in a Motorola extended real goes between the exponent and
3676 the mantissa; remove it. */
3682 }
3684 /* Convert from the internal format to the 12-byte Intel format for
3685 an IEEE extended real. */
3686 static void
3689 {
3691 {
3692 /* All the padding in an Intel-format extended real goes at the high
3693 end, which in this case is after the mantissa, not the exponent.
3694 Therefore we must shift everything up 16 bits. */
3702 }
3703 else
3704 /* decode_ieee_extended produces what we want directly. */
3706 }
3708 /* Convert from the internal format to the 16-byte Intel format for
3709 an IEEE extended real. */
3710 static void
3713 {
3714 /* All the padding in an Intel-format extended real goes at the high end. */
3716 }
3719 {
3720 encode_ieee_extended_motorola,
3721 decode_ieee_extended_motorola,
3738 "ieee_extended_motorola"
3739 };
3742 {
3743 encode_ieee_extended_intel_96,
3744 decode_ieee_extended_intel_96,
3761 "ieee_extended_intel_96"
3762 };
3765 {
3766 encode_ieee_extended_intel_128,
3767 decode_ieee_extended_intel_128,
3784 "ieee_extended_intel_128"
3785 };
3787 /* The following caters to i386 systems that set the rounding precision
3788 to 53 bits instead of 64, e.g. FreeBSD. */
3790 {
3791 encode_ieee_extended_intel_96,
3792 decode_ieee_extended_intel_96,
3809 "ieee_extended_intel_96_round_53"
3810 };
3811 \f
3812 /* IBM 128-bit extended precision format: a pair of IEEE double precision
3813 numbers whose sum is equal to the extended precision value. The number
3814 with greater magnitude is first. This format has the same magnitude
3815 range as an IEEE double precision value, but effectively 106 bits of
3816 significand precision. Infinity and NaN are represented by their IEEE
3817 double precision value stored in the first number, the second number is
3818 +0.0 or -0.0 for Infinity and don't-care for NaN. */
3825 static void
3828 {
3834 /* Renormalize R before doing any arithmetic on it. */
3839 /* u = IEEE double precision portion of significand. */
3845 {
3847 /* Call round_for_format since we might need to denormalize. */
3850 }
3851 else
3852 {
3853 /* Inf, NaN, 0 are all representable as doubles, so the
3854 least-significant part can be 0.0. */
3857 }
3858 }
3860 static void
3863 {
3871 {
3874 }
3875 else
3877 }
3880 {
3881 encode_ibm_extended,
3882 decode_ibm_extended,
3899 "ibm_extended"
3900 };
3903 {
3904 encode_ibm_extended,
3905 decode_ibm_extended,
3922 "mips_extended"
3923 };
3925 \f
3926 /* IEEE quad precision format. */
3933 static void
3936 {
3939 REAL_VALUE_TYPE u;
3949 {
3956 else
3957 {
3962 }
3967 {
3971 {
3973 {
3976 }
3977 }
3979 {
3984 }
3985 else
3986 {
3993 }
3996 else
4000 }
4001 else
4002 {
4007 }
4011 /* Recall that IEEE numbers are interpreted as 1.F x 2**exp,
4012 whereas the intermediate representation is 0.F x 2**exp.
4013 Which means we're off by one. */
4016 else
4021 {
4026 }
4027 else
4028 {
4035 }
4040 }
4043 {
4048 }
4049 else
4050 {
4055 }
4056 }
4058 static void
4061 {
4067 {
4072 }
4073 else
4074 {
4079 }
4091 {
4093 {
4099 {
4104 }
4105 else
4106 {
4109 }
4112 }
4115 }
4117 {
4119 {
4125 {
4130 }
4131 else
4132 {
4135 }
4137 }
4138 else
4139 {
4142 }
4143 }
4144 else
4145 {
4151 {
4156 }
4157 else
4158 {
4161 }
4164 }
4165 }
4168 {
4169 encode_ieee_quad,
4170 decode_ieee_quad,
4187 "ieee_quad"
4188 };
4191 {
4192 encode_ieee_quad,
4193 decode_ieee_quad,
4210 "mips_quad"
4211 };
4212 \f
4213 /* Descriptions of VAX floating point formats can be found beginning at
4215 http://h71000.www7.hp.com/doc/73FINAL/4515/4515pro_013.html#f_floating_point_format
4217 The thing to remember is that they're almost IEEE, except for word
4218 order, exponent bias, and the lack of infinities, nans, and denormals.
4220 We don't implement the H_floating format here, simply because neither
4221 the VAX or Alpha ports use it. */
4236 static void
4239 {
4245 {
4267 }
4270 }
4272 static void
4275 {
4282 {
4289 }
4290 }
4292 static void
4295 {
4299 {
4311 /* Extract the significand into straight hi:lo. */
4313 {
4317 }
4318 else
4319 {
4324 }
4326 /* Rearrange the half-words of the significand to match the
4327 external format. */
4331 /* Add the sign and exponent. */
4338 }
4342 else
4344 }
4346 static void
4349 {
4355 else
4365 {
4370 /* Rearrange the half-words of the external format into
4371 proper ascending order. */
4376 {
4381 }
4382 else
4383 {
4388 }
4389 }
4390 }
4392 static void
4395 {
4399 {
4411 /* Extract the significand into straight hi:lo. */
4413 {
4417 }
4418 else
4419 {
4424 }
4426 /* Rearrange the half-words of the significand to match the
4427 external format. */
4431 /* Add the sign and exponent. */
4438 }
4442 else
4444 }
4446 static void
4449 {
4455 else
4465 {
4470 /* Rearrange the half-words of the external format into
4471 proper ascending order. */
4476 {
4481 }
4482 else
4483 {
4488 }
4489 }
4490 }
4493 {
4494 encode_vax_f,
4495 decode_vax_f,
4512 "vax_f"
4513 };
4516 {
4517 encode_vax_d,
4518 decode_vax_d,
4535 "vax_d"
4536 };
4539 {
4540 encode_vax_g,
4541 decode_vax_g,
4558 "vax_g"
4559 };
4560 \f
4561 /* Encode real R into a single precision DFP value in BUF. */
4562 static void
4566 {
4568 }
4570 /* Decode a single precision DFP value in BUF into a real R. */
4571 static void
4575 {
4577 }
4579 /* Encode real R into a double precision DFP value in BUF. */
4580 static void
4584 {
4586 }
4588 /* Decode a double precision DFP value in BUF into a real R. */
4589 static void
4593 {
4595 }
4597 /* Encode real R into a quad precision DFP value in BUF. */
4598 static void
4602 {
4604 }
4606 /* Decode a quad precision DFP value in BUF into a real R. */
4607 static void
4611 {
4613 }
4615 /* Single precision decimal floating point (IEEE 754). */
4617 {
4618 encode_decimal_single,
4619 decode_decimal_single,
4636 "decimal_single"
4637 };
4639 /* Double precision decimal floating point (IEEE 754). */
4641 {
4642 encode_decimal_double,
4643 decode_decimal_double,
4660 "decimal_double"
4661 };
4663 /* Quad precision decimal floating point (IEEE 754). */
4665 {
4666 encode_decimal_quad,
4667 decode_decimal_quad,
4684 "decimal_quad"
4685 };
4686 \f
4687 /* Encode half-precision floats. This routine is used both for the IEEE
4688 ARM alternative encodings. */
4689 static void
4692 {
4701 {
4708 else
4714 {
4719 else
4726 }
4727 else
4732 /* Recall that IEEE numbers are interpreted as 1.F x 2**exp,
4733 whereas the intermediate representation is 0.F x 2**exp.
4734 Which means we're off by one. */
4737 else
4745 }
4748 }
4750 /* Decode half-precision floats. This routine is used both for the IEEE
4751 ARM alternative encodings. */
4752 static void
4755 {
4765 {
4767 {
4773 }
4776 }
4778 {
4780 {
4786 }
4787 else
4788 {
4791 }
4792 }
4793 else
4794 {
4799 }
4800 }
4802 /* Half-precision format, as specified in IEEE 754R. */
4804 {
4805 encode_ieee_half,
4806 decode_ieee_half,
4823 "ieee_half"
4824 };
4826 /* ARM's alternative half-precision format, similar to IEEE but with
4827 no reserved exponent value for NaNs and infinities; rather, it just
4828 extends the range of exponents by one. */
4830 {
4831 encode_ieee_half,
4832 decode_ieee_half,
4849 "arm_half"
4850 };
4851 \f
4852 /* A synthetic "format" for internal arithmetic. It's the size of the
4853 internal significand minus the two bits needed for proper rounding.
4854 The encode and decode routines exist only to satisfy our paranoia
4855 harness. */
4862 static void
4865 {
4867 }
4869 static void
4872 {
4874 }
4877 {
4878 encode_internal,
4879 decode_internal,
4884 MAX_EXP,
4896 "real_internal"
4897 };
4898 \f
4899 /* Calculate X raised to the integer exponent N in format FMT and store
4900 the result in R. Return true if the result may be inexact due to
4901 loss of precision. The algorithm is the classic "left-to-right binary
4902 method" described in section 4.6.3 of Donald Knuth's "Seminumerical
4903 Algorithms", "The Art of Computer Programming", Volume 2. */
4905 bool
4908 {
4910 REAL_VALUE_TYPE t;
4917 {
4920 }
4922 {
4923 /* Don't worry about overflow, from now on n is unsigned. */
4926 }
4927 else
4933 {
4935 {
4939 }
4943 }
4950 }
4952 /* Round X to the nearest integer not larger in absolute value, i.e.
4953 towards zero, placing the result in R in format FMT. */
4955 void
4958 {
4962 }
4964 /* Round X to the largest integer not greater in value, i.e. round
4965 down, placing the result in R in format FMT. */
4967 void
4970 {
4971 REAL_VALUE_TYPE t;
4978 else
4980 }
4982 /* Round X to the smallest integer not less then argument, i.e. round
4983 up, placing the result in R in format FMT. */
4985 void
4988 {
4989 REAL_VALUE_TYPE t;
4996 else
4998 }
5000 /* Round X to the nearest integer, but round halfway cases away from
5001 zero. */
5003 void
5006 {
5011 }
5013 /* Set the sign of R to the sign of X. */
5015 void
5017 {
5019 }
5021 /* Check whether the real constant value given is an integer.
5022 Returns false for signaling NaN. */
5024 bool
5026 {
5027 REAL_VALUE_TYPE cint;
5031 }
5033 /* Check whether C is an integer that fits in a HOST_WIDE_INT,
5034 storing it in *INT_OUT if so. */
5036 bool
5038 {
5039 REAL_VALUE_TYPE cint;
5044 {
5047 }
5049 }
5051 /* Write into BUF the maximum representable finite floating-point
5052 number, (1 - b**-p) * b**emax for a given FP format FMT as a hex
5053 float string. LEN is the size of BUF, and the buffer must be large
5054 enough to contain the resulting string. */
5056 void
5058 {
5070 {
5071 /* This is an IBM extended double format made up of two IEEE
5072 doubles. The value of the long double is the sum of the
5073 values of the two parts. The most significant part is
5074 required to be the value of the long double rounded to the
5075 nearest double. Rounding means we need a slightly smaller
5076 value for LDBL_MAX. */
5078 }
5081 }
5083 /* True if mode M has a NaN representation and
5084 the treatment of NaN operands is important. */
5086 bool
5088 {
5090 }
5092 bool
5094 {
5096 }
5098 bool
5100 {
5102 }
5104 /* Like HONOR_NANs, but true if we honor signaling NaNs (or sNaNs). */
5106 bool
5108 {
5110 }
5112 bool
5114 {
5116 }
5118 bool
5120 {
5122 }
5124 /* As for HONOR_NANS, but true if the mode can represent infinity and
5125 the treatment of infinite values is important. */
5127 bool
5129 {
5131 }
5133 bool
5135 {
5137 }
5139 bool
5141 {
5143 }
5145 /* Like HONOR_NANS, but true if the given mode distinguishes between
5146 positive and negative zero, and the sign of zero is important. */
5148 bool
5150 {
5152 }
5154 bool
5156 {
5158 }
5160 bool
5162 {
5164 }
5166 /* Like HONOR_NANS, but true if given mode supports sign-dependent rounding,
5167 and the rounding mode is important. */
5169 bool
5171 {
5173 }
5175 bool
5177 {
5179 }
5181 bool
5183 {
5185 }