Mercurial > hg > CbC > CbC_gcc
comparison libquadmath/math/lgammaq_neg.c @ 145:1830386684a0
gcc-9.2.0
| author | anatofuz |
|---|---|
| date | Thu, 13 Feb 2020 11:34:05 +0900 |
| parents | |
| children |
comparison
equal
deleted
inserted
replaced
| 131:84e7813d76e9 | 145:1830386684a0 |
|---|---|
| 1 /* lgammal expanding around zeros. | |
| 2 Copyright (C) 2015-2018 Free Software Foundation, Inc. | |
| 3 This file is part of the GNU C Library. | |
| 4 | |
| 5 The GNU C Library is free software; you can redistribute it and/or | |
| 6 modify it under the terms of the GNU Lesser General Public | |
| 7 License as published by the Free Software Foundation; either | |
| 8 version 2.1 of the License, or (at your option) any later version. | |
| 9 | |
| 10 The GNU C Library is distributed in the hope that it will be useful, | |
| 11 but WITHOUT ANY WARRANTY; without even the implied warranty of | |
| 12 MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU | |
| 13 Lesser General Public License for more details. | |
| 14 | |
| 15 You should have received a copy of the GNU Lesser General Public | |
| 16 License along with the GNU C Library; if not, see | |
| 17 <http://www.gnu.org/licenses/>. */ | |
| 18 | |
| 19 #include "quadmath-imp.h" | |
| 20 | |
| 21 static const __float128 lgamma_zeros[][2] = | |
| 22 { | |
| 23 { -0x2.74ff92c01f0d82abec9f315f1a08p+0Q, 0xe.d3ccb7fb2658634a2b9f6b2ba81p-116Q }, | |
| 24 { -0x2.bf6821437b20197995a4b4641eaep+0Q, -0xb.f4b00b4829f961e428533e6ad048p-116Q }, | |
| 25 { -0x3.24c1b793cb35efb8be699ad3d9bap+0Q, -0x6.5454cb7fac60e3f16d9d7840c2ep-116Q }, | |
| 26 { -0x3.f48e2a8f85fca170d4561291236cp+0Q, -0xc.320a4887d1cb4c711828a75d5758p-116Q }, | |
| 27 { -0x4.0a139e16656030c39f0b0de18114p+0Q, 0x1.53e84029416e1242006b2b3d1cfp-112Q }, | |
| 28 { -0x4.fdd5de9bbabf3510d0aa40769884p+0Q, -0x1.01d7d78125286f78d1e501f14966p-112Q }, | |
| 29 { -0x5.021a95fc2db6432a4c56e595394cp+0Q, -0x1.ecc6af0430d4fe5746fa7233356fp-112Q }, | |
| 30 { -0x5.ffa4bd647d0357dd4ed62cbd31ecp+0Q, -0x1.f8e3f8e5deba2d67dbd70dd96ce1p-112Q }, | |
| 31 { -0x6.005ac9625f233b607c2d96d16384p+0Q, -0x1.cb86ac569340cf1e5f24df7aab7bp-112Q }, | |
| 32 { -0x6.fff2fddae1bbff3d626b65c23fd4p+0Q, 0x1.e0bfcff5c457ebcf4d3ad9674167p-112Q }, | |
| 33 { -0x7.000cff7b7f87adf4482dcdb98784p+0Q, 0x1.54d99e35a74d6407b80292df199fp-112Q }, | |
| 34 { -0x7.fffe5fe05673c3ca9e82b522b0ccp+0Q, 0x1.62d177c832e0eb42c2faffd1b145p-112Q }, | |
| 35 { -0x8.0001a01459fc9f60cb3cec1cec88p+0Q, 0x2.8998835ac7277f7bcef67c47f188p-112Q }, | |
| 36 { -0x8.ffffd1c425e80ffc864e95749258p+0Q, -0x1.e7e20210e7f81cf781b44e9d2b02p-112Q }, | |
| 37 { -0x9.00002e3bb47d86d6d843fedc352p+0Q, 0x2.14852f613a16291751d2ab751f7ep-112Q }, | |
| 38 { -0x9.fffffb606bdfdcd062ae77a50548p+0Q, 0x3.962d1490cc2e8f031c7007eaa1ap-116Q }, | |
| 39 { -0xa.0000049f93bb9927b45d95e1544p+0Q, -0x1.e03086db9146a9287bd4f2172d5ap-112Q }, | |
| 40 { -0xa.ffffff9466e9f1b36dacd2adbd18p+0Q, -0xd.05a4e458062f3f95345a4d9c9b6p-116Q }, | |
| 41 { -0xb.0000006b9915315d965a6ffea41p+0Q, 0x1.b415c6fff233e7b7fdc3a094246fp-112Q }, | |
| 42 { -0xb.fffffff7089387387de41acc3d4p+0Q, 0x3.687427c6373bd74a10306e10a28ep-112Q }, | |
| 43 { -0xc.00000008f76c7731567c0f0250fp+0Q, -0x3.87920df5675833859190eb128ef6p-112Q }, | |
| 44 { -0xc.ffffffff4f6dcf617f97a5ffc758p+0Q, 0x2.ab72d76f32eaee2d1a42ed515d3ap-116Q }, | |
| 45 { -0xd.00000000b092309c06683dd1b9p+0Q, -0x3.e3700857a15c19ac5a611de9688ap-112Q }, | |
| 46 { -0xd.fffffffff36345ab9e184a3e09dp+0Q, -0x1.176dc48e47f62d917973dd44e553p-112Q }, | |
| 47 { -0xe.000000000c9cba545e94e75ec57p+0Q, -0x1.8f753e2501e757a17cf2ecbeeb89p-112Q }, | |
| 48 { -0xe.ffffffffff28c060c6604ef3037p+0Q, -0x1.f89d37357c9e3dc17c6c6e63becap-112Q }, | |
| 49 { -0xf.0000000000d73f9f399bd0e420f8p+0Q, -0x5.e9ee31b0b890744fc0e3fbc01048p-116Q }, | |
| 50 { -0xf.fffffffffff28c060c6621f512e8p+0Q, 0xd.1b2eec9d960bd9adc5be5f5fa5p-116Q }, | |
| 51 { -0x1.000000000000d73f9f399da1424cp+4Q, 0x6.c46e0e88305d2800f0e414c506a8p-116Q }, | |
| 52 { -0x1.0ffffffffffff3569c47e7a93e1cp+4Q, -0x4.6a08a2e008a998ebabb8087efa2cp-112Q }, | |
| 53 { -0x1.1000000000000ca963b818568887p+4Q, -0x6.ca5a3a64ec15db0a95caf2c9ffb4p-112Q }, | |
| 54 { -0x1.1fffffffffffff4bec3ce234132dp+4Q, -0x8.b2b726187c841cb92cd5221e444p-116Q }, | |
| 55 { -0x1.20000000000000b413c31dcbeca5p+4Q, 0x3.c4d005344b6cd0e7231120294abcp-112Q }, | |
| 56 { -0x1.2ffffffffffffff685b25cbf5f54p+4Q, -0x5.ced932e38485f7dd296b8fa41448p-112Q }, | |
| 57 { -0x1.30000000000000097a4da340a0acp+4Q, 0x7.e484e0e0ffe38d406ebebe112f88p-112Q }, | |
| 58 { -0x1.3fffffffffffffff86af516ff7f7p+4Q, -0x6.bd67e720d57854502b7db75e1718p-112Q }, | |
| 59 { -0x1.40000000000000007950ae900809p+4Q, 0x6.bec33375cac025d9c073168c5d9p-112Q }, | |
| 60 { -0x1.4ffffffffffffffffa391c4248c3p+4Q, 0x5.c63022b62b5484ba346524db607p-112Q }, | |
| 61 { -0x1.500000000000000005c6e3bdb73dp+4Q, -0x5.c62f55ed5322b2685c5e9a51e6a8p-112Q }, | |
| 62 { -0x1.5fffffffffffffffffbcc71a492p+4Q, -0x1.eb5aeb96c74d7ad25e060528fb5p-112Q }, | |
| 63 { -0x1.6000000000000000004338e5b6ep+4Q, 0x1.eb5aec04b2f2eb663e4e3d8a018cp-112Q }, | |
| 64 { -0x1.6ffffffffffffffffffd13c97d9dp+4Q, -0x3.8fcc4d08d6fe5aa56ab04307ce7ep-112Q }, | |
| 65 { -0x1.70000000000000000002ec368263p+4Q, 0x3.8fcc4d090cee2f5d0b69a99c353cp-112Q }, | |
| 66 { -0x1.7fffffffffffffffffffe0d30fe7p+4Q, 0x7.2f577cca4b4c8cb1dc14001ac5ecp-112Q }, | |
| 67 { -0x1.800000000000000000001f2cf019p+4Q, -0x7.2f577cca4b3442e35f0040b3b9e8p-112Q }, | |
| 68 { -0x1.8ffffffffffffffffffffec0c332p+4Q, -0x2.e9a0572b1bb5b95f346a92d67a6p-112Q }, | |
| 69 { -0x1.90000000000000000000013f3ccep+4Q, 0x2.e9a0572b1bb5c371ddb3561705ap-112Q }, | |
| 70 { -0x1.9ffffffffffffffffffffff3b8bdp+4Q, -0x1.cad8d32e386fd783e97296d63dcbp-116Q }, | |
| 71 { -0x1.a0000000000000000000000c4743p+4Q, 0x1.cad8d32e386fd7c1ab8c1fe34c0ep-116Q }, | |
| 72 { -0x1.afffffffffffffffffffffff8b95p+4Q, -0x3.8f48cc5737d5979c39db806c5406p-112Q }, | |
| 73 { -0x1.b00000000000000000000000746bp+4Q, 0x3.8f48cc5737d5979c3b3a6bda06f6p-112Q }, | |
| 74 { -0x1.bffffffffffffffffffffffffbd8p+4Q, 0x6.2898d42174dcf171470d8c8c6028p-112Q }, | |
| 75 { -0x1.c000000000000000000000000428p+4Q, -0x6.2898d42174dcf171470d18ba412cp-112Q }, | |
| 76 { -0x1.cfffffffffffffffffffffffffdbp+4Q, -0x4.c0ce9794ea50a839e311320bde94p-112Q }, | |
| 77 { -0x1.d000000000000000000000000025p+4Q, 0x4.c0ce9794ea50a839e311322f7cf8p-112Q }, | |
| 78 { -0x1.dfffffffffffffffffffffffffffp+4Q, 0x3.932c5047d60e60caded4c298a174p-112Q }, | |
| 79 { -0x1.e000000000000000000000000001p+4Q, -0x3.932c5047d60e60caded4c298973ap-112Q }, | |
| 80 { -0x1.fp+4Q, 0xa.1a6973c1fade2170f7237d35fe3p-116Q }, | |
| 81 { -0x1.fp+4Q, -0xa.1a6973c1fade2170f7237d35fe08p-116Q }, | |
| 82 { -0x2p+4Q, 0x5.0d34b9e0fd6f10b87b91be9aff1p-120Q }, | |
| 83 { -0x2p+4Q, -0x5.0d34b9e0fd6f10b87b91be9aff0cp-120Q }, | |
| 84 { -0x2.1p+4Q, 0x2.73024a9ba1aa36a7059bff52e844p-124Q }, | |
| 85 { -0x2.1p+4Q, -0x2.73024a9ba1aa36a7059bff52e844p-124Q }, | |
| 86 { -0x2.2p+4Q, 0x1.2710231c0fd7a13f8a2b4af9d6b7p-128Q }, | |
| 87 { -0x2.2p+4Q, -0x1.2710231c0fd7a13f8a2b4af9d6b7p-128Q }, | |
| 88 { -0x2.3p+4Q, 0x8.6e2ce38b6c8f9419e3fad3f0312p-136Q }, | |
| 89 { -0x2.3p+4Q, -0x8.6e2ce38b6c8f9419e3fad3f0312p-136Q }, | |
| 90 { -0x2.4p+4Q, 0x3.bf30652185952560d71a254e4eb8p-140Q }, | |
| 91 { -0x2.4p+4Q, -0x3.bf30652185952560d71a254e4eb8p-140Q }, | |
| 92 { -0x2.5p+4Q, 0x1.9ec8d1c94e85af4c78b15c3d89d3p-144Q }, | |
| 93 { -0x2.5p+4Q, -0x1.9ec8d1c94e85af4c78b15c3d89d3p-144Q }, | |
| 94 { -0x2.6p+4Q, 0xa.ea565ce061d57489e9b85276274p-152Q }, | |
| 95 { -0x2.6p+4Q, -0xa.ea565ce061d57489e9b85276274p-152Q }, | |
| 96 { -0x2.7p+4Q, 0x4.7a6512692eb37804111dabad30ecp-156Q }, | |
| 97 { -0x2.7p+4Q, -0x4.7a6512692eb37804111dabad30ecp-156Q }, | |
| 98 { -0x2.8p+4Q, 0x1.ca8ed42a12ae3001a07244abad2bp-160Q }, | |
| 99 { -0x2.8p+4Q, -0x1.ca8ed42a12ae3001a07244abad2bp-160Q }, | |
| 100 { -0x2.9p+4Q, 0xb.2f30e1ce812063f12e7e8d8d96e8p-168Q }, | |
| 101 { -0x2.9p+4Q, -0xb.2f30e1ce812063f12e7e8d8d96e8p-168Q }, | |
| 102 { -0x2.ap+4Q, 0x4.42bd49d4c37a0db136489772e428p-172Q }, | |
| 103 { -0x2.ap+4Q, -0x4.42bd49d4c37a0db136489772e428p-172Q }, | |
| 104 { -0x2.bp+4Q, 0x1.95db45257e5122dcbae56def372p-176Q }, | |
| 105 { -0x2.bp+4Q, -0x1.95db45257e5122dcbae56def372p-176Q }, | |
| 106 { -0x2.cp+4Q, 0x9.3958d81ff63527ecf993f3fb6f48p-184Q }, | |
| 107 { -0x2.cp+4Q, -0x9.3958d81ff63527ecf993f3fb6f48p-184Q }, | |
| 108 { -0x2.dp+4Q, 0x3.47970e4440c8f1c058bd238c9958p-188Q }, | |
| 109 { -0x2.dp+4Q, -0x3.47970e4440c8f1c058bd238c9958p-188Q }, | |
| 110 { -0x2.ep+4Q, 0x1.240804f65951062ca46e4f25c608p-192Q }, | |
| 111 { -0x2.ep+4Q, -0x1.240804f65951062ca46e4f25c608p-192Q }, | |
| 112 { -0x2.fp+4Q, 0x6.36a382849fae6de2d15362d8a394p-200Q }, | |
| 113 { -0x2.fp+4Q, -0x6.36a382849fae6de2d15362d8a394p-200Q }, | |
| 114 { -0x3p+4Q, 0x2.123680d6dfe4cf4b9b1bcb9d8bdcp-204Q }, | |
| 115 { -0x3p+4Q, -0x2.123680d6dfe4cf4b9b1bcb9d8bdcp-204Q }, | |
| 116 { -0x3.1p+4Q, 0xa.d21786ff5842eca51fea0870919p-212Q }, | |
| 117 { -0x3.1p+4Q, -0xa.d21786ff5842eca51fea0870919p-212Q }, | |
| 118 { -0x3.2p+4Q, 0x3.766dedc259af040be140a68a6c04p-216Q }, | |
| 119 }; | |
| 120 | |
| 121 static const __float128 e_hi = 0x2.b7e151628aed2a6abf7158809cf4p+0Q; | |
| 122 static const __float128 e_lo = 0xf.3c762e7160f38b4da56a784d9048p-116Q; | |
| 123 | |
| 124 | |
| 125 /* Coefficients B_2k / 2k(2k-1) of x^-(2k-1) in Stirling's | |
| 126 approximation to lgamma function. */ | |
| 127 | |
| 128 static const __float128 lgamma_coeff[] = | |
| 129 { | |
| 130 0x1.5555555555555555555555555555p-4Q, | |
| 131 -0xb.60b60b60b60b60b60b60b60b60b8p-12Q, | |
| 132 0x3.4034034034034034034034034034p-12Q, | |
| 133 -0x2.7027027027027027027027027028p-12Q, | |
| 134 0x3.72a3c5631fe46ae1d4e700dca8f2p-12Q, | |
| 135 -0x7.daac36664f1f207daac36664f1f4p-12Q, | |
| 136 0x1.a41a41a41a41a41a41a41a41a41ap-8Q, | |
| 137 -0x7.90a1b2c3d4e5f708192a3b4c5d7p-8Q, | |
| 138 0x2.dfd2c703c0cfff430edfd2c703cp-4Q, | |
| 139 -0x1.6476701181f39edbdb9ce625987dp+0Q, | |
| 140 0xd.672219167002d3a7a9c886459cp+0Q, | |
| 141 -0x9.cd9292e6660d55b3f712eb9e07c8p+4Q, | |
| 142 0x8.911a740da740da740da740da741p+8Q, | |
| 143 -0x8.d0cc570e255bf59ff6eec24b49p+12Q, | |
| 144 0xa.8d1044d3708d1c219ee4fdc446ap+16Q, | |
| 145 -0xe.8844d8a169abbc406169abbc406p+20Q, | |
| 146 0x1.6d29a0f6433b79890cede62433b8p+28Q, | |
| 147 -0x2.88a233b3c8cddaba9809357125d8p+32Q, | |
| 148 0x5.0dde6f27500939a85c40939a85c4p+36Q, | |
| 149 -0xb.4005bde03d4642a243581714af68p+40Q, | |
| 150 0x1.bc8cd6f8f1f755c78753cdb5d5c9p+48Q, | |
| 151 -0x4.bbebb143bb94de5a0284fa7ec424p+52Q, | |
| 152 0xe.2e1337f5af0bed90b6b0a352d4fp+56Q, | |
| 153 -0x2.e78250162b62405ad3e4bfe61b38p+64Q, | |
| 154 0xa.5f7eef9e71ac7c80326ab4cc8bfp+68Q, | |
| 155 -0x2.83be0395e550213369924971b21ap+76Q, | |
| 156 0xa.8ebfe48da17dd999790760b0cep+80Q, | |
| 157 }; | |
| 158 | |
| 159 #define NCOEFF (sizeof (lgamma_coeff) / sizeof (lgamma_coeff[0])) | |
| 160 | |
| 161 /* Polynomial approximations to (|gamma(x)|-1)(x-n)/(x-x0), where n is | |
| 162 the integer end-point of the half-integer interval containing x and | |
| 163 x0 is the zero of lgamma in that half-integer interval. Each | |
| 164 polynomial is expressed in terms of x-xm, where xm is the midpoint | |
| 165 of the interval for which the polynomial applies. */ | |
| 166 | |
| 167 static const __float128 poly_coeff[] = | |
| 168 { | |
| 169 /* Interval [-2.125, -2] (polynomial degree 23). */ | |
| 170 -0x1.0b71c5c54d42eb6c17f30b7aa8f5p+0Q, | |
| 171 -0xc.73a1dc05f34951602554c6d7506p-4Q, | |
| 172 -0x1.ec841408528b51473e6c425ee5ffp-4Q, | |
| 173 -0xe.37c9da26fc3c9a3c1844c8c7f1cp-4Q, | |
| 174 -0x1.03cd87c519305703b021fa33f827p-4Q, | |
| 175 -0xe.ae9ada65e09aa7f1c75216128f58p-4Q, | |
| 176 0x9.b11855a4864b5731cf85736015a8p-8Q, | |
| 177 -0xe.f28c133e697a95c28607c9701dep-4Q, | |
| 178 0x2.6ec14a1c586a72a7cc33ee569d6ap-4Q, | |
| 179 -0xf.57cab973e14464a262fc24723c38p-4Q, | |
| 180 0x4.5b0fc25f16e52997b2886bbae808p-4Q, | |
| 181 -0xf.f50e59f1a9b56e76e988dac9ccf8p-4Q, | |
| 182 0x6.5f5eae15e9a93369e1d85146c6fcp-4Q, | |
| 183 -0x1.0d2422daac459e33e0994325ed23p+0Q, | |
| 184 0x8.82000a0e7401fb1117a0e6606928p-4Q, | |
| 185 -0x1.1f492f178a3f1b19f58a2ca68e55p+0Q, | |
| 186 0xa.cb545f949899a04c160b19389abp-4Q, | |
| 187 -0x1.36165a1b155ba3db3d1b77caf498p+0Q, | |
| 188 0xd.44c5d5576f74302e5cf79e183eep-4Q, | |
| 189 -0x1.51f22e0cdd33d3d481e326c02f3ep+0Q, | |
| 190 0xf.f73a349c08244ac389c007779bfp-4Q, | |
| 191 -0x1.73317bf626156ba716747c4ca866p+0Q, | |
| 192 0x1.379c3c97b9bc71e1c1c4802dd657p+0Q, | |
| 193 -0x1.a72a351c54f902d483052000f5dfp+0Q, | |
| 194 /* Interval [-2.25, -2.125] (polynomial degree 24). */ | |
| 195 -0xf.2930890d7d675a80c36afb0fd5e8p-4Q, | |
| 196 -0xc.a5cfde054eab5c6770daeca577f8p-4Q, | |
| 197 0x3.9c9e0fdebb07cdf89c61d41c9238p-4Q, | |
| 198 -0x1.02a5ad35605fcf4af65a6dbacb84p+0Q, | |
| 199 0x9.6e9b1185bb48be9de1918e00a2e8p-4Q, | |
| 200 -0x1.4d8332f3cfbfa116fd611e9ce90dp+0Q, | |
| 201 0x1.1c0c8cb4d9f4b1d490e1a41fae4dp+0Q, | |
| 202 -0x1.c9a6f5ae9130cd0299e293a42714p+0Q, | |
| 203 0x1.d7e9307fd58a2ea997f29573a112p+0Q, | |
| 204 -0x2.921cb3473d96178ca2a11d2a8d46p+0Q, | |
| 205 0x2.e8d59113b6f3409ff8db226e9988p+0Q, | |
| 206 -0x3.cbab931625a1ae2b26756817f264p+0Q, | |
| 207 0x4.7d9f0f05d5296d18663ca003912p+0Q, | |
| 208 -0x5.ade9cba12a14ea485667b7135bbp+0Q, | |
| 209 0x6.dc983a5da74fb48e767b7fec0a3p+0Q, | |
| 210 -0x8.8d9ed454ae31d9e138dd8ee0d1a8p+0Q, | |
| 211 0xa.6fa099d4e7c202e0c0fd6ed8492p+0Q, | |
| 212 -0xc.ebc552a8090a0f0115e92d4ebbc8p+0Q, | |
| 213 0xf.d695e4772c0d829b53fba9ca5568p+0Q, | |
| 214 -0x1.38c32ae38e5e9eb79b2a4c5570a9p+4Q, | |
| 215 0x1.8035145646cfab49306d0999a51bp+4Q, | |
| 216 -0x1.d930adbb03dd342a4c2a8c4e1af6p+4Q, | |
| 217 0x2.45c2edb1b4943ddb3686cd9c6524p+4Q, | |
| 218 -0x2.e818ebbfafe2f916fa21abf7756p+4Q, | |
| 219 0x3.9804ce51d0fb9a430a711fd7307p+4Q, | |
| 220 /* Interval [-2.375, -2.25] (polynomial degree 25). */ | |
| 221 -0xd.7d28d505d6181218a25f31d5e45p-4Q, | |
| 222 -0xe.69649a3040985140cdf946829fap-4Q, | |
| 223 0xb.0d74a2827d053a8d44595012484p-4Q, | |
| 224 -0x1.924b0922853617cac181afbc08ddp+0Q, | |
| 225 0x1.d49b12bccf0a568582e2d3c410f3p+0Q, | |
| 226 -0x3.0898bb7d8c4093e636279c791244p+0Q, | |
| 227 0x4.207a6cac711cb53868e8a5057eep+0Q, | |
| 228 -0x6.39ee63ea4fb1dcab0c9144bf3ddcp+0Q, | |
| 229 0x8.e2e2556a797b649bf3f53bd26718p+0Q, | |
| 230 -0xd.0e83ac82552ef12af508589e7a8p+0Q, | |
| 231 0x1.2e4525e0ce6670563c6484a82b05p+4Q, | |
| 232 -0x1.b8e350d6a8f2b222fa390a57c23dp+4Q, | |
| 233 0x2.805cd69b919087d8a80295892c2cp+4Q, | |
| 234 -0x3.a42585424a1b7e64c71743ab014p+4Q, | |
| 235 0x5.4b4f409f98de49f7bfb03c05f984p+4Q, | |
| 236 -0x7.b3c5827fbe934bc820d6832fb9fcp+4Q, | |
| 237 0xb.33b7b90cc96c425526e0d0866e7p+4Q, | |
| 238 -0x1.04b77047ac4f59ee3775ca10df0dp+8Q, | |
| 239 0x1.7b366f5e94a34f41386eac086313p+8Q, | |
| 240 -0x2.2797338429385c9849ca6355bfc2p+8Q, | |
| 241 0x3.225273cf92a27c9aac1b35511256p+8Q, | |
| 242 -0x4.8f078aa48afe6cb3a4e89690f898p+8Q, | |
| 243 0x6.9f311d7b6654fc1d0b5195141d04p+8Q, | |
| 244 -0x9.a0c297b6b4621619ca9bacc48ed8p+8Q, | |
| 245 0xe.ce1f06b6f90d92138232a76e4cap+8Q, | |
| 246 -0x1.5b0e6806fa064daf011613e43b17p+12Q, | |
| 247 /* Interval [-2.5, -2.375] (polynomial degree 27). */ | |
| 248 -0xb.74ea1bcfff94b2c01afba9daa7d8p-4Q, | |
| 249 -0x1.2a82bd590c37538cab143308de4dp+0Q, | |
| 250 0x1.88020f828b966fec66b8649fd6fcp+0Q, | |
| 251 -0x3.32279f040eb694970e9db24863dcp+0Q, | |
| 252 0x5.57ac82517767e68a721005853864p+0Q, | |
| 253 -0x9.c2aedcfe22833de43834a0a6cc4p+0Q, | |
| 254 0x1.12c132f1f5577f99e1a0ed3538e1p+4Q, | |
| 255 -0x1.ea94e26628a3de3597f7bb55a948p+4Q, | |
| 256 0x3.66b4ac4fa582f58b59f96b2f7c7p+4Q, | |
| 257 -0x6.0cf746a9cf4cba8c39afcc73fc84p+4Q, | |
| 258 0xa.c102ef2c20d75a342197df7fedf8p+4Q, | |
| 259 -0x1.31ebff06e8f14626782df58db3b6p+8Q, | |
| 260 0x2.1fd6f0c0e710994e059b9dbdb1fep+8Q, | |
| 261 -0x3.c6d76040407f447f8b5074f07706p+8Q, | |
| 262 0x6.b6d18e0d8feb4c2ef5af6a40ed18p+8Q, | |
| 263 -0xb.efaf542c529f91e34217f24ae6a8p+8Q, | |
| 264 0x1.53852d873210e7070f5d9eb2296p+12Q, | |
| 265 -0x2.5b977c0ddc6d540717173ac29fc8p+12Q, | |
| 266 0x4.310d452ae05100eff1e02343a724p+12Q, | |
| 267 -0x7.73a5d8f20c4f986a7dd1912b2968p+12Q, | |
| 268 0xd.3f5ea2484f3fca15eab1f4d1a218p+12Q, | |
| 269 -0x1.78d18aac156d1d93a2ffe7e08d3fp+16Q, | |
| 270 0x2.9df49ca75e5b567f5ea3e47106cp+16Q, | |
| 271 -0x4.a7149af8961a08aa7c3233b5bb94p+16Q, | |
| 272 0x8.3db10ffa742c707c25197d989798p+16Q, | |
| 273 -0xe.a26d6dd023cadd02041a049ec368p+16Q, | |
| 274 0x1.c825d90514e7c57c7fa5316f947cp+20Q, | |
| 275 -0x3.34bb81e5a0952df8ca1abdc6684cp+20Q, | |
| 276 /* Interval [-2.625, -2.5] (polynomial degree 28). */ | |
| 277 -0x3.d10108c27ebafad533c20eac32bp-4Q, | |
| 278 0x1.cd557caff7d2b2085f41dbec5106p+0Q, | |
| 279 0x3.819b4856d399520dad9776ea2cacp+0Q, | |
| 280 0x6.8505cbad03dc34c5e42e8b12eb78p+0Q, | |
| 281 0xb.c1b2e653a9e38f82b399c94e7f08p+0Q, | |
| 282 0x1.50a53a38f148138105124df65419p+4Q, | |
| 283 0x2.57ae00cbe5232cbeeed34d89727ap+4Q, | |
| 284 0x4.2b156301b8604db85a601544bfp+4Q, | |
| 285 0x7.6989ed23ca3ca7579b3462592b5cp+4Q, | |
| 286 0xd.2dd2976557939517f831f5552cc8p+4Q, | |
| 287 0x1.76e1c3430eb860969bce40cd494p+8Q, | |
| 288 0x2.9a77bf5488742466db3a2c7c1ec6p+8Q, | |
| 289 0x4.a0d62ed7266e8eb36f725a8ebcep+8Q, | |
| 290 0x8.3a6184dd3021067df2f8b91e99c8p+8Q, | |
| 291 0xe.a0ade1538245bf55d39d7e436b1p+8Q, | |
| 292 0x1.a01359fae8617b5826dd74428e9p+12Q, | |
| 293 0x2.e3b0a32caae77251169acaca1ad4p+12Q, | |
| 294 0x5.2301257c81589f62b38fb5993ee8p+12Q, | |
| 295 0x9.21c9275db253d4e719b73b18cb9p+12Q, | |
| 296 0x1.03c104bc96141cda3f3fa4b112bcp+16Q, | |
| 297 0x1.cdc8ed65119196a08b0c78f1445p+16Q, | |
| 298 0x3.34f31d2eaacf34382cdb0073572ap+16Q, | |
| 299 0x5.b37628cadf12bf0000907d0ef294p+16Q, | |
| 300 0xa.22d8b332c0b1e6a616f425dfe5ap+16Q, | |
| 301 0x1.205b01444804c3ff922cd78b4c42p+20Q, | |
| 302 0x1.fe8f0cea9d1e0ff25be2470b4318p+20Q, | |
| 303 0x3.8872aebeb368399aee02b39340aep+20Q, | |
| 304 0x6.ebd560d351e84e26a4381f5b293cp+20Q, | |
| 305 0xc.c3644d094b0dae2fbcbf682cd428p+20Q, | |
| 306 /* Interval [-2.75, -2.625] (polynomial degree 26). */ | |
| 307 -0x6.b5d252a56e8a75458a27ed1c2dd4p-4Q, | |
| 308 0x1.28d60383da3ac721aed3c5794da9p+0Q, | |
| 309 0x1.db6513ada8a66ea77d87d9a8827bp+0Q, | |
| 310 0x2.e217118f9d348a27f7506a707e6ep+0Q, | |
| 311 0x4.450112c5cbf725a0fb9802396c9p+0Q, | |
| 312 0x6.4af99151eae7810a75df2a0303c4p+0Q, | |
| 313 0x9.2db598b4a97a7f69aeef32aec758p+0Q, | |
| 314 0xd.62bef9c22471f5ee47ea1b9c0b5p+0Q, | |
| 315 0x1.379f294e412bd62328326d4222f9p+4Q, | |
| 316 0x1.c5827349d8865f1e8825c37c31c6p+4Q, | |
| 317 0x2.93a7e7a75b7568cc8cbe8c016c12p+4Q, | |
| 318 0x3.bf9bb882afe57edb383d41879d3ap+4Q, | |
| 319 0x5.73c737828cee095c43a5566731c8p+4Q, | |
| 320 0x7.ee4653493a7f81e0442062b3823cp+4Q, | |
| 321 0xb.891c6b83fc8b55bd973b5d962d6p+4Q, | |
| 322 0x1.0c775d7de3bf9b246c0208e0207ep+8Q, | |
| 323 0x1.867ee43ec4bd4f4fd56abc05110ap+8Q, | |
| 324 0x2.37fe9ba6695821e9822d8c8af0a6p+8Q, | |
| 325 0x3.3a2c667e37c942f182cd3223a936p+8Q, | |
| 326 0x4.b1b500eb59f3f782c7ccec88754p+8Q, | |
| 327 0x6.d3efd3b65b3d0d8488d30b79fa4cp+8Q, | |
| 328 0x9.ee8224e65bed5ced8b75eaec609p+8Q, | |
| 329 0xe.72416e510cca77d53fc615c1f3dp+8Q, | |
| 330 0x1.4fb538b0a2dfe567a8904b7e0445p+12Q, | |
| 331 0x1.e7f56a9266cf525a5b8cf4cb76cep+12Q, | |
| 332 0x2.f0365c983f68c597ee49d099cce8p+12Q, | |
| 333 0x4.53aa229e1b9f5b5e59625265951p+12Q, | |
| 334 /* Interval [-2.875, -2.75] (polynomial degree 24). */ | |
| 335 -0x8.a41b1e4f36ff88dc820815607d68p-4Q, | |
| 336 0xc.da87d3b69dc0f2f9c6f368b8ca1p-4Q, | |
| 337 0x1.1474ad5c36158a7bea04fd2f98c6p+0Q, | |
| 338 0x1.761ecb90c555df6555b7dba955b6p+0Q, | |
| 339 0x1.d279bff9ae291caf6c4b4bcb3202p+0Q, | |
| 340 0x2.4e5d00559a6e2b9b5d7fe1f6689cp+0Q, | |
| 341 0x2.d57545a75cee8743ae2b17bc8d24p+0Q, | |
| 342 0x3.8514eee3aac88b89bec2307021bap+0Q, | |
| 343 0x4.5235e3b6e1891ffeb87fed9f8a24p+0Q, | |
| 344 0x5.562acdb10eef3c9a773b3e27a864p+0Q, | |
| 345 0x6.8ec8965c76efe03c26bff60b1194p+0Q, | |
| 346 0x8.15251aca144877af32658399f9b8p+0Q, | |
| 347 0x9.f08d56aba174d844138af782c0f8p+0Q, | |
| 348 0xc.3dbbeda2679e8a1346ccc3f6da88p+0Q, | |
| 349 0xf.0f5bfd5eacc26db308ffa0556fa8p+0Q, | |
| 350 0x1.28a6ccd84476fbc713d6bab49ac9p+4Q, | |
| 351 0x1.6d0a3ae2a3b1c8ff400641a3a21fp+4Q, | |
| 352 0x1.c15701b28637f87acfb6a91d33b5p+4Q, | |
| 353 0x2.28fbe0eccf472089b017651ca55ep+4Q, | |
| 354 0x2.a8a453004f6e8ffaacd1603bc3dp+4Q, | |
| 355 0x3.45ae4d9e1e7cd1a5dba0e4ec7f6cp+4Q, | |
| 356 0x4.065fbfacb7fad3e473cb577a61e8p+4Q, | |
| 357 0x4.f3d1473020927acac1944734a39p+4Q, | |
| 358 0x6.54bb091245815a36fb74e314dd18p+4Q, | |
| 359 0x7.d7f445129f7fb6c055e582d3f6ep+4Q, | |
| 360 /* Interval [-3, -2.875] (polynomial degree 23). */ | |
| 361 -0xa.046d667e468f3e44dcae1afcc648p-4Q, | |
| 362 0x9.70b88dcc006c214d8d996fdf5ccp-4Q, | |
| 363 0xa.a8a39421c86d3ff24931a0929fp-4Q, | |
| 364 0xd.2f4d1363f324da2b357c8b6ec94p-4Q, | |
| 365 0xd.ca9aa1a3a5c00de11bf60499a97p-4Q, | |
| 366 0xf.cf09c31eeb52a45dfa7ebe3778dp-4Q, | |
| 367 0x1.04b133a39ed8a09691205660468bp+0Q, | |
| 368 0x1.22b547a06edda944fcb12fd9b5ecp+0Q, | |
| 369 0x1.2c57fce7db86a91df09602d344b3p+0Q, | |
| 370 0x1.4aade4894708f84795212fe257eep+0Q, | |
| 371 0x1.579c8b7b67ec4afed5b28c8bf787p+0Q, | |
| 372 0x1.776820e7fc80ae5284239733078ap+0Q, | |
| 373 0x1.883ab28c7301fde4ca6b8ec26ec8p+0Q, | |
| 374 0x1.aa2ef6e1ae52eb42c9ee83b206e3p+0Q, | |
| 375 0x1.bf4ad50f0a9a9311300cf0c51ee7p+0Q, | |
| 376 0x1.e40206e0e96b1da463814dde0d09p+0Q, | |
| 377 0x1.fdcbcffef3a21b29719c2bd9feb1p+0Q, | |
| 378 0x2.25e2e8948939c4d42cf108fae4bep+0Q, | |
| 379 0x2.44ce14d2b59c1c0e6bf2cfa81018p+0Q, | |
| 380 0x2.70ee80bbd0387162be4861c43622p+0Q, | |
| 381 0x2.954b64d2c2ebf3489b949c74476p+0Q, | |
| 382 0x2.c616e133a811c1c9446105208656p+0Q, | |
| 383 0x3.05a69dfe1a9ba1079f90fcf26bd4p+0Q, | |
| 384 0x3.410d2ad16a0506de29736e6aafdap+0Q, | |
| 385 }; | |
| 386 | |
| 387 static const size_t poly_deg[] = | |
| 388 { | |
| 389 23, | |
| 390 24, | |
| 391 25, | |
| 392 27, | |
| 393 28, | |
| 394 26, | |
| 395 24, | |
| 396 23, | |
| 397 }; | |
| 398 | |
| 399 static const size_t poly_end[] = | |
| 400 { | |
| 401 23, | |
| 402 48, | |
| 403 74, | |
| 404 102, | |
| 405 131, | |
| 406 158, | |
| 407 183, | |
| 408 207, | |
| 409 }; | |
| 410 | |
| 411 /* Compute sin (pi * X) for -0.25 <= X <= 0.5. */ | |
| 412 | |
| 413 static __float128 | |
| 414 lg_sinpi (__float128 x) | |
| 415 { | |
| 416 if (x <= 0.25Q) | |
| 417 return sinq (M_PIq * x); | |
| 418 else | |
| 419 return cosq (M_PIq * (0.5Q - x)); | |
| 420 } | |
| 421 | |
| 422 /* Compute cos (pi * X) for -0.25 <= X <= 0.5. */ | |
| 423 | |
| 424 static __float128 | |
| 425 lg_cospi (__float128 x) | |
| 426 { | |
| 427 if (x <= 0.25Q) | |
| 428 return cosq (M_PIq * x); | |
| 429 else | |
| 430 return sinq (M_PIq * (0.5Q - x)); | |
| 431 } | |
| 432 | |
| 433 /* Compute cot (pi * X) for -0.25 <= X <= 0.5. */ | |
| 434 | |
| 435 static __float128 | |
| 436 lg_cotpi (__float128 x) | |
| 437 { | |
| 438 return lg_cospi (x) / lg_sinpi (x); | |
| 439 } | |
| 440 | |
| 441 /* Compute lgamma of a negative argument -50 < X < -2, setting | |
| 442 *SIGNGAMP accordingly. */ | |
| 443 | |
| 444 __float128 | |
| 445 __quadmath_lgamma_negq (__float128 x, int *signgamp) | |
| 446 { | |
| 447 /* Determine the half-integer region X lies in, handle exact | |
| 448 integers and determine the sign of the result. */ | |
| 449 int i = floorq (-2 * x); | |
| 450 if ((i & 1) == 0 && i == -2 * x) | |
| 451 return 1.0Q / 0.0Q; | |
| 452 __float128 xn = ((i & 1) == 0 ? -i / 2 : (-i - 1) / 2); | |
| 453 i -= 4; | |
| 454 *signgamp = ((i & 2) == 0 ? -1 : 1); | |
| 455 | |
| 456 SET_RESTORE_ROUNDF128 (FE_TONEAREST); | |
| 457 | |
| 458 /* Expand around the zero X0 = X0_HI + X0_LO. */ | |
| 459 __float128 x0_hi = lgamma_zeros[i][0], x0_lo = lgamma_zeros[i][1]; | |
| 460 __float128 xdiff = x - x0_hi - x0_lo; | |
| 461 | |
| 462 /* For arguments in the range -3 to -2, use polynomial | |
| 463 approximations to an adjusted version of the gamma function. */ | |
| 464 if (i < 2) | |
| 465 { | |
| 466 int j = floorq (-8 * x) - 16; | |
| 467 __float128 xm = (-33 - 2 * j) * 0.0625Q; | |
| 468 __float128 x_adj = x - xm; | |
| 469 size_t deg = poly_deg[j]; | |
| 470 size_t end = poly_end[j]; | |
| 471 __float128 g = poly_coeff[end]; | |
| 472 for (size_t j = 1; j <= deg; j++) | |
| 473 g = g * x_adj + poly_coeff[end - j]; | |
| 474 return log1pq (g * xdiff / (x - xn)); | |
| 475 } | |
| 476 | |
| 477 /* The result we want is log (sinpi (X0) / sinpi (X)) | |
| 478 + log (gamma (1 - X0) / gamma (1 - X)). */ | |
| 479 __float128 x_idiff = fabsq (xn - x), x0_idiff = fabsq (xn - x0_hi - x0_lo); | |
| 480 __float128 log_sinpi_ratio; | |
| 481 if (x0_idiff < x_idiff * 0.5Q) | |
| 482 /* Use log not log1p to avoid inaccuracy from log1p of arguments | |
| 483 close to -1. */ | |
| 484 log_sinpi_ratio = logq (lg_sinpi (x0_idiff) | |
| 485 / lg_sinpi (x_idiff)); | |
| 486 else | |
| 487 { | |
| 488 /* Use log1p not log to avoid inaccuracy from log of arguments | |
| 489 close to 1. X0DIFF2 has positive sign if X0 is further from | |
| 490 XN than X is from XN, negative sign otherwise. */ | |
| 491 __float128 x0diff2 = ((i & 1) == 0 ? xdiff : -xdiff) * 0.5Q; | |
| 492 __float128 sx0d2 = lg_sinpi (x0diff2); | |
| 493 __float128 cx0d2 = lg_cospi (x0diff2); | |
| 494 log_sinpi_ratio = log1pq (2 * sx0d2 | |
| 495 * (-sx0d2 + cx0d2 * lg_cotpi (x_idiff))); | |
| 496 } | |
| 497 | |
| 498 __float128 log_gamma_ratio; | |
| 499 __float128 y0 = 1 - x0_hi; | |
| 500 __float128 y0_eps = -x0_hi + (1 - y0) - x0_lo; | |
| 501 __float128 y = 1 - x; | |
| 502 __float128 y_eps = -x + (1 - y); | |
| 503 /* We now wish to compute LOG_GAMMA_RATIO | |
| 504 = log (gamma (Y0 + Y0_EPS) / gamma (Y + Y_EPS)). XDIFF | |
| 505 accurately approximates the difference Y0 + Y0_EPS - Y - | |
| 506 Y_EPS. Use Stirling's approximation. First, we may need to | |
| 507 adjust into the range where Stirling's approximation is | |
| 508 sufficiently accurate. */ | |
| 509 __float128 log_gamma_adj = 0; | |
| 510 if (i < 20) | |
| 511 { | |
| 512 int n_up = (21 - i) / 2; | |
| 513 __float128 ny0, ny0_eps, ny, ny_eps; | |
| 514 ny0 = y0 + n_up; | |
| 515 ny0_eps = y0 - (ny0 - n_up) + y0_eps; | |
| 516 y0 = ny0; | |
| 517 y0_eps = ny0_eps; | |
| 518 ny = y + n_up; | |
| 519 ny_eps = y - (ny - n_up) + y_eps; | |
| 520 y = ny; | |
| 521 y_eps = ny_eps; | |
| 522 __float128 prodm1 = __quadmath_lgamma_productq (xdiff, y - n_up, y_eps, n_up); | |
| 523 log_gamma_adj = -log1pq (prodm1); | |
| 524 } | |
| 525 __float128 log_gamma_high | |
| 526 = (xdiff * log1pq ((y0 - e_hi - e_lo + y0_eps) / e_hi) | |
| 527 + (y - 0.5Q + y_eps) * log1pq (xdiff / y) + log_gamma_adj); | |
| 528 /* Compute the sum of (B_2k / 2k(2k-1))(Y0^-(2k-1) - Y^-(2k-1)). */ | |
| 529 __float128 y0r = 1 / y0, yr = 1 / y; | |
| 530 __float128 y0r2 = y0r * y0r, yr2 = yr * yr; | |
| 531 __float128 rdiff = -xdiff / (y * y0); | |
| 532 __float128 bterm[NCOEFF]; | |
| 533 __float128 dlast = rdiff, elast = rdiff * yr * (yr + y0r); | |
| 534 bterm[0] = dlast * lgamma_coeff[0]; | |
| 535 for (size_t j = 1; j < NCOEFF; j++) | |
| 536 { | |
| 537 __float128 dnext = dlast * y0r2 + elast; | |
| 538 __float128 enext = elast * yr2; | |
| 539 bterm[j] = dnext * lgamma_coeff[j]; | |
| 540 dlast = dnext; | |
| 541 elast = enext; | |
| 542 } | |
| 543 __float128 log_gamma_low = 0; | |
| 544 for (size_t j = 0; j < NCOEFF; j++) | |
| 545 log_gamma_low += bterm[NCOEFF - 1 - j]; | |
| 546 log_gamma_ratio = log_gamma_high + log_gamma_low; | |
| 547 | |
| 548 return log_sinpi_ratio + log_gamma_ratio; | |
| 549 } |