ibm-ldouble.c revision 1.1.1.4
1 1.1 mrg /* 128-bit long double support routines for Darwin. 2 1.1.1.4 mrg Copyright (C) 1993-2017 Free Software Foundation, Inc. 3 1.1 mrg 4 1.1 mrg This file is part of GCC. 5 1.1 mrg 6 1.1 mrg GCC is free software; you can redistribute it and/or modify it under 7 1.1 mrg the terms of the GNU General Public License as published by the Free 8 1.1 mrg Software Foundation; either version 3, or (at your option) any later 9 1.1 mrg version. 10 1.1 mrg 11 1.1 mrg GCC is distributed in the hope that it will be useful, but WITHOUT ANY 12 1.1 mrg WARRANTY; without even the implied warranty of MERCHANTABILITY or 13 1.1 mrg FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License 14 1.1 mrg for more details. 15 1.1 mrg 16 1.1 mrg Under Section 7 of GPL version 3, you are granted additional 17 1.1 mrg permissions described in the GCC Runtime Library Exception, version 18 1.1 mrg 3.1, as published by the Free Software Foundation. 19 1.1 mrg 20 1.1 mrg You should have received a copy of the GNU General Public License and 21 1.1 mrg a copy of the GCC Runtime Library Exception along with this program; 22 1.1 mrg see the files COPYING3 and COPYING.RUNTIME respectively. If not, see 23 1.1 mrg <http://www.gnu.org/licenses/>. */ 24 1.1 mrg 25 1.1 mrg 26 1.1 mrg /* Implementations of floating-point long double basic arithmetic 27 1.1 mrg functions called by the IBM C compiler when generating code for 28 1.1 mrg PowerPC platforms. In particular, the following functions are 29 1.1 mrg implemented: __gcc_qadd, __gcc_qsub, __gcc_qmul, and __gcc_qdiv. 30 1.1 mrg Double-double algorithms are based on the paper "Doubled-Precision 31 1.1 mrg IEEE Standard 754 Floating-Point Arithmetic" by W. Kahan, February 26, 32 1.1 mrg 1987. An alternative published reference is "Software for 33 1.1 mrg Doubled-Precision Floating-Point Computations", by Seppo Linnainmaa, 34 1.1 mrg ACM TOMS vol 7 no 3, September 1981, pages 272-283. */ 35 1.1 mrg 36 1.1 mrg /* Each long double is made up of two IEEE doubles. The value of the 37 1.1 mrg long double is the sum of the values of the two parts. The most 38 1.1 mrg significant part is required to be the value of the long double 39 1.1 mrg rounded to the nearest double, as specified by IEEE. For Inf 40 1.1 mrg values, the least significant part is required to be one of +0.0 or 41 1.1 mrg -0.0. No other requirements are made; so, for example, 1.0 may be 42 1.1 mrg represented as (1.0, +0.0) or (1.0, -0.0), and the low part of a 43 1.1 mrg NaN is don't-care. 44 1.1 mrg 45 1.1 mrg This code currently assumes the most significant double is in 46 1.1 mrg the lower numbered register or lower addressed memory. */ 47 1.1 mrg 48 1.1.1.4 mrg #if (defined (__MACH__) || defined (__powerpc__) || defined (_AIX)) \ 49 1.1.1.4 mrg && !defined (__rtems__) 50 1.1 mrg 51 1.1 mrg #define fabs(x) __builtin_fabs(x) 52 1.1 mrg #define isless(x, y) __builtin_isless (x, y) 53 1.1 mrg #define inf() __builtin_inf() 54 1.1 mrg 55 1.1 mrg #define unlikely(x) __builtin_expect ((x), 0) 56 1.1 mrg 57 1.1 mrg #define nonfinite(a) unlikely (! isless (fabs (a), inf ())) 58 1.1 mrg 59 1.1 mrg /* Define ALIASNAME as a strong alias for NAME. */ 60 1.1 mrg # define strong_alias(name, aliasname) _strong_alias(name, aliasname) 61 1.1 mrg # define _strong_alias(name, aliasname) \ 62 1.1 mrg extern __typeof (name) aliasname __attribute__ ((alias (#name))); 63 1.1 mrg 64 1.1 mrg /* All these routines actually take two long doubles as parameters, 65 1.1 mrg but GCC currently generates poor code when a union is used to turn 66 1.1 mrg a long double into a pair of doubles. */ 67 1.1 mrg 68 1.1 mrg long double __gcc_qadd (double, double, double, double); 69 1.1 mrg long double __gcc_qsub (double, double, double, double); 70 1.1 mrg long double __gcc_qmul (double, double, double, double); 71 1.1 mrg long double __gcc_qdiv (double, double, double, double); 72 1.1 mrg 73 1.1 mrg #if defined __ELF__ && defined SHARED \ 74 1.1 mrg && (defined __powerpc64__ || !(defined __linux__ || defined __gnu_hurd__)) 75 1.1 mrg /* Provide definitions of the old symbol names to satisfy apps and 76 1.1 mrg shared libs built against an older libgcc. To access the _xlq 77 1.1 mrg symbols an explicit version reference is needed, so these won't 78 1.1 mrg satisfy an unadorned reference like _xlqadd. If dot symbols are 79 1.1 mrg not needed, the assembler will remove the aliases from the symbol 80 1.1 mrg table. */ 81 1.1 mrg __asm__ (".symver __gcc_qadd,_xlqadd (at) GCC_3.4\n\t" 82 1.1 mrg ".symver __gcc_qsub,_xlqsub (at) GCC_3.4\n\t" 83 1.1 mrg ".symver __gcc_qmul,_xlqmul (at) GCC_3.4\n\t" 84 1.1 mrg ".symver __gcc_qdiv,_xlqdiv (at) GCC_3.4\n\t" 85 1.1 mrg ".symver .__gcc_qadd,._xlqadd (at) GCC_3.4\n\t" 86 1.1 mrg ".symver .__gcc_qsub,._xlqsub (at) GCC_3.4\n\t" 87 1.1 mrg ".symver .__gcc_qmul,._xlqmul (at) GCC_3.4\n\t" 88 1.1 mrg ".symver .__gcc_qdiv,._xlqdiv (at) GCC_3.4"); 89 1.1 mrg #endif 90 1.1 mrg 91 1.1.1.2 mrg /* Combine two 'double' values into one 'long double' and return the result. */ 92 1.1.1.2 mrg static inline long double 93 1.1.1.2 mrg pack_ldouble (double dh, double dl) 94 1.1.1.2 mrg { 95 1.1.1.2 mrg #if defined (__LONG_DOUBLE_128__) \ 96 1.1.1.2 mrg && !(defined (_SOFT_FLOAT) || defined (__NO_FPRS__)) 97 1.1.1.2 mrg return __builtin_pack_longdouble (dh, dl); 98 1.1.1.2 mrg #else 99 1.1.1.2 mrg union 100 1.1.1.2 mrg { 101 1.1.1.2 mrg long double ldval; 102 1.1.1.2 mrg double dval[2]; 103 1.1.1.2 mrg } x; 104 1.1.1.2 mrg x.dval[0] = dh; 105 1.1.1.2 mrg x.dval[1] = dl; 106 1.1.1.2 mrg return x.ldval; 107 1.1.1.2 mrg #endif 108 1.1.1.2 mrg } 109 1.1 mrg 110 1.1 mrg /* Add two 'long double' values and return the result. */ 111 1.1 mrg long double 112 1.1 mrg __gcc_qadd (double a, double aa, double c, double cc) 113 1.1 mrg { 114 1.1.1.2 mrg double xh, xl, z, q, zz; 115 1.1 mrg 116 1.1 mrg z = a + c; 117 1.1 mrg 118 1.1 mrg if (nonfinite (z)) 119 1.1 mrg { 120 1.1.1.2 mrg if (fabs (z) != inf()) 121 1.1.1.2 mrg return z; 122 1.1 mrg z = cc + aa + c + a; 123 1.1 mrg if (nonfinite (z)) 124 1.1 mrg return z; 125 1.1.1.2 mrg xh = z; /* Will always be DBL_MAX. */ 126 1.1 mrg zz = aa + cc; 127 1.1 mrg if (fabs(a) > fabs(c)) 128 1.1.1.2 mrg xl = a - z + c + zz; 129 1.1 mrg else 130 1.1.1.2 mrg xl = c - z + a + zz; 131 1.1 mrg } 132 1.1 mrg else 133 1.1 mrg { 134 1.1 mrg q = a - z; 135 1.1 mrg zz = q + c + (a - (q + z)) + aa + cc; 136 1.1 mrg 137 1.1 mrg /* Keep -0 result. */ 138 1.1 mrg if (zz == 0.0) 139 1.1 mrg return z; 140 1.1 mrg 141 1.1 mrg xh = z + zz; 142 1.1 mrg if (nonfinite (xh)) 143 1.1 mrg return xh; 144 1.1 mrg 145 1.1.1.2 mrg xl = z - xh + zz; 146 1.1 mrg } 147 1.1.1.2 mrg return pack_ldouble (xh, xl); 148 1.1 mrg } 149 1.1 mrg 150 1.1 mrg long double 151 1.1 mrg __gcc_qsub (double a, double b, double c, double d) 152 1.1 mrg { 153 1.1 mrg return __gcc_qadd (a, b, -c, -d); 154 1.1 mrg } 155 1.1 mrg 156 1.1 mrg #ifdef __NO_FPRS__ 157 1.1 mrg static double fmsub (double, double, double); 158 1.1 mrg #endif 159 1.1 mrg 160 1.1 mrg long double 161 1.1 mrg __gcc_qmul (double a, double b, double c, double d) 162 1.1 mrg { 163 1.1.1.2 mrg double xh, xl, t, tau, u, v, w; 164 1.1 mrg 165 1.1 mrg t = a * c; /* Highest order double term. */ 166 1.1 mrg 167 1.1 mrg if (unlikely (t == 0) /* Preserve -0. */ 168 1.1 mrg || nonfinite (t)) 169 1.1 mrg return t; 170 1.1 mrg 171 1.1 mrg /* Sum terms of two highest orders. */ 172 1.1 mrg 173 1.1 mrg /* Use fused multiply-add to get low part of a * c. */ 174 1.1 mrg #ifndef __NO_FPRS__ 175 1.1 mrg asm ("fmsub %0,%1,%2,%3" : "=f"(tau) : "f"(a), "f"(c), "f"(t)); 176 1.1 mrg #else 177 1.1 mrg tau = fmsub (a, c, t); 178 1.1 mrg #endif 179 1.1 mrg v = a*d; 180 1.1 mrg w = b*c; 181 1.1 mrg tau += v + w; /* Add in other second-order terms. */ 182 1.1 mrg u = t + tau; 183 1.1 mrg 184 1.1 mrg /* Construct long double result. */ 185 1.1 mrg if (nonfinite (u)) 186 1.1 mrg return u; 187 1.1.1.2 mrg xh = u; 188 1.1.1.2 mrg xl = (t - u) + tau; 189 1.1.1.2 mrg return pack_ldouble (xh, xl); 190 1.1 mrg } 191 1.1 mrg 192 1.1 mrg long double 193 1.1 mrg __gcc_qdiv (double a, double b, double c, double d) 194 1.1 mrg { 195 1.1.1.2 mrg double xh, xl, s, sigma, t, tau, u, v, w; 196 1.1 mrg 197 1.1 mrg t = a / c; /* highest order double term */ 198 1.1 mrg 199 1.1 mrg if (unlikely (t == 0) /* Preserve -0. */ 200 1.1 mrg || nonfinite (t)) 201 1.1 mrg return t; 202 1.1 mrg 203 1.1 mrg /* Finite nonzero result requires corrections to the highest order 204 1.1 mrg term. These corrections require the low part of c * t to be 205 1.1 mrg exactly represented in double. */ 206 1.1 mrg if (fabs (a) <= 0x1p-969) 207 1.1 mrg { 208 1.1 mrg a *= 0x1p106; 209 1.1 mrg b *= 0x1p106; 210 1.1 mrg c *= 0x1p106; 211 1.1 mrg d *= 0x1p106; 212 1.1 mrg } 213 1.1 mrg 214 1.1 mrg s = c * t; /* (s,sigma) = c*t exactly. */ 215 1.1 mrg w = -(-b + d * t); /* Written to get fnmsub for speed, but not 216 1.1 mrg numerically necessary. */ 217 1.1 mrg 218 1.1 mrg /* Use fused multiply-add to get low part of c * t. */ 219 1.1 mrg #ifndef __NO_FPRS__ 220 1.1 mrg asm ("fmsub %0,%1,%2,%3" : "=f"(sigma) : "f"(c), "f"(t), "f"(s)); 221 1.1 mrg #else 222 1.1 mrg sigma = fmsub (c, t, s); 223 1.1 mrg #endif 224 1.1 mrg v = a - s; 225 1.1 mrg 226 1.1 mrg tau = ((v-sigma)+w)/c; /* Correction to t. */ 227 1.1 mrg u = t + tau; 228 1.1 mrg 229 1.1 mrg /* Construct long double result. */ 230 1.1 mrg if (nonfinite (u)) 231 1.1 mrg return u; 232 1.1.1.2 mrg xh = u; 233 1.1.1.2 mrg xl = (t - u) + tau; 234 1.1.1.2 mrg return pack_ldouble (xh, xl); 235 1.1 mrg } 236 1.1 mrg 237 1.1 mrg #if defined (_SOFT_DOUBLE) && defined (__LONG_DOUBLE_128__) 238 1.1 mrg 239 1.1 mrg long double __gcc_qneg (double, double); 240 1.1 mrg int __gcc_qeq (double, double, double, double); 241 1.1 mrg int __gcc_qne (double, double, double, double); 242 1.1 mrg int __gcc_qge (double, double, double, double); 243 1.1 mrg int __gcc_qle (double, double, double, double); 244 1.1 mrg long double __gcc_stoq (float); 245 1.1 mrg long double __gcc_dtoq (double); 246 1.1 mrg float __gcc_qtos (double, double); 247 1.1 mrg double __gcc_qtod (double, double); 248 1.1 mrg int __gcc_qtoi (double, double); 249 1.1 mrg unsigned int __gcc_qtou (double, double); 250 1.1 mrg long double __gcc_itoq (int); 251 1.1 mrg long double __gcc_utoq (unsigned int); 252 1.1 mrg 253 1.1 mrg extern int __eqdf2 (double, double); 254 1.1 mrg extern int __ledf2 (double, double); 255 1.1 mrg extern int __gedf2 (double, double); 256 1.1 mrg 257 1.1 mrg /* Negate 'long double' value and return the result. */ 258 1.1 mrg long double 259 1.1 mrg __gcc_qneg (double a, double aa) 260 1.1 mrg { 261 1.1.1.2 mrg return pack_ldouble (-a, -aa); 262 1.1 mrg } 263 1.1 mrg 264 1.1 mrg /* Compare two 'long double' values for equality. */ 265 1.1 mrg int 266 1.1 mrg __gcc_qeq (double a, double aa, double c, double cc) 267 1.1 mrg { 268 1.1 mrg if (__eqdf2 (a, c) == 0) 269 1.1 mrg return __eqdf2 (aa, cc); 270 1.1 mrg return 1; 271 1.1 mrg } 272 1.1 mrg 273 1.1 mrg strong_alias (__gcc_qeq, __gcc_qne); 274 1.1 mrg 275 1.1 mrg /* Compare two 'long double' values for less than or equal. */ 276 1.1 mrg int 277 1.1 mrg __gcc_qle (double a, double aa, double c, double cc) 278 1.1 mrg { 279 1.1 mrg if (__eqdf2 (a, c) == 0) 280 1.1 mrg return __ledf2 (aa, cc); 281 1.1 mrg return __ledf2 (a, c); 282 1.1 mrg } 283 1.1 mrg 284 1.1 mrg strong_alias (__gcc_qle, __gcc_qlt); 285 1.1 mrg 286 1.1 mrg /* Compare two 'long double' values for greater than or equal. */ 287 1.1 mrg int 288 1.1 mrg __gcc_qge (double a, double aa, double c, double cc) 289 1.1 mrg { 290 1.1 mrg if (__eqdf2 (a, c) == 0) 291 1.1 mrg return __gedf2 (aa, cc); 292 1.1 mrg return __gedf2 (a, c); 293 1.1 mrg } 294 1.1 mrg 295 1.1 mrg strong_alias (__gcc_qge, __gcc_qgt); 296 1.1 mrg 297 1.1 mrg /* Convert single to long double. */ 298 1.1 mrg long double 299 1.1 mrg __gcc_stoq (float a) 300 1.1 mrg { 301 1.1.1.2 mrg return pack_ldouble ((double) a, 0.0); 302 1.1 mrg } 303 1.1 mrg 304 1.1 mrg /* Convert double to long double. */ 305 1.1 mrg long double 306 1.1 mrg __gcc_dtoq (double a) 307 1.1 mrg { 308 1.1.1.2 mrg return pack_ldouble (a, 0.0); 309 1.1 mrg } 310 1.1 mrg 311 1.1 mrg /* Convert long double to single. */ 312 1.1 mrg float 313 1.1 mrg __gcc_qtos (double a, double aa __attribute__ ((__unused__))) 314 1.1 mrg { 315 1.1 mrg return (float) a; 316 1.1 mrg } 317 1.1 mrg 318 1.1 mrg /* Convert long double to double. */ 319 1.1 mrg double 320 1.1 mrg __gcc_qtod (double a, double aa __attribute__ ((__unused__))) 321 1.1 mrg { 322 1.1 mrg return a; 323 1.1 mrg } 324 1.1 mrg 325 1.1 mrg /* Convert long double to int. */ 326 1.1 mrg int 327 1.1 mrg __gcc_qtoi (double a, double aa) 328 1.1 mrg { 329 1.1 mrg double z = a + aa; 330 1.1 mrg return (int) z; 331 1.1 mrg } 332 1.1 mrg 333 1.1 mrg /* Convert long double to unsigned int. */ 334 1.1 mrg unsigned int 335 1.1 mrg __gcc_qtou (double a, double aa) 336 1.1 mrg { 337 1.1 mrg double z = a + aa; 338 1.1 mrg return (unsigned int) z; 339 1.1 mrg } 340 1.1 mrg 341 1.1 mrg /* Convert int to long double. */ 342 1.1 mrg long double 343 1.1 mrg __gcc_itoq (int a) 344 1.1 mrg { 345 1.1 mrg return __gcc_dtoq ((double) a); 346 1.1 mrg } 347 1.1 mrg 348 1.1 mrg /* Convert unsigned int to long double. */ 349 1.1 mrg long double 350 1.1 mrg __gcc_utoq (unsigned int a) 351 1.1 mrg { 352 1.1 mrg return __gcc_dtoq ((double) a); 353 1.1 mrg } 354 1.1 mrg 355 1.1 mrg #endif 356 1.1 mrg 357 1.1 mrg #ifdef __NO_FPRS__ 358 1.1 mrg 359 1.1 mrg int __gcc_qunord (double, double, double, double); 360 1.1 mrg 361 1.1 mrg extern int __eqdf2 (double, double); 362 1.1 mrg extern int __unorddf2 (double, double); 363 1.1 mrg 364 1.1 mrg /* Compare two 'long double' values for unordered. */ 365 1.1 mrg int 366 1.1 mrg __gcc_qunord (double a, double aa, double c, double cc) 367 1.1 mrg { 368 1.1 mrg if (__eqdf2 (a, c) == 0) 369 1.1 mrg return __unorddf2 (aa, cc); 370 1.1 mrg return __unorddf2 (a, c); 371 1.1 mrg } 372 1.1 mrg 373 1.1 mrg #include "soft-fp/soft-fp.h" 374 1.1 mrg #include "soft-fp/double.h" 375 1.1 mrg #include "soft-fp/quad.h" 376 1.1 mrg 377 1.1 mrg /* Compute floating point multiply-subtract with higher (quad) precision. */ 378 1.1 mrg static double 379 1.1 mrg fmsub (double a, double b, double c) 380 1.1 mrg { 381 1.1 mrg FP_DECL_EX; 382 1.1 mrg FP_DECL_D(A); 383 1.1 mrg FP_DECL_D(B); 384 1.1 mrg FP_DECL_D(C); 385 1.1 mrg FP_DECL_Q(X); 386 1.1 mrg FP_DECL_Q(Y); 387 1.1 mrg FP_DECL_Q(Z); 388 1.1 mrg FP_DECL_Q(U); 389 1.1 mrg FP_DECL_Q(V); 390 1.1 mrg FP_DECL_D(R); 391 1.1 mrg double r; 392 1.1 mrg long double u, x, y, z; 393 1.1 mrg 394 1.1 mrg FP_INIT_ROUNDMODE; 395 1.1 mrg FP_UNPACK_RAW_D (A, a); 396 1.1 mrg FP_UNPACK_RAW_D (B, b); 397 1.1 mrg FP_UNPACK_RAW_D (C, c); 398 1.1 mrg 399 1.1 mrg /* Extend double to quad. */ 400 1.1 mrg #if (2 * _FP_W_TYPE_SIZE) < _FP_FRACBITS_Q 401 1.1 mrg FP_EXTEND(Q,D,4,2,X,A); 402 1.1 mrg FP_EXTEND(Q,D,4,2,Y,B); 403 1.1 mrg FP_EXTEND(Q,D,4,2,Z,C); 404 1.1 mrg #else 405 1.1 mrg FP_EXTEND(Q,D,2,1,X,A); 406 1.1 mrg FP_EXTEND(Q,D,2,1,Y,B); 407 1.1 mrg FP_EXTEND(Q,D,2,1,Z,C); 408 1.1 mrg #endif 409 1.1 mrg FP_PACK_RAW_Q(x,X); 410 1.1 mrg FP_PACK_RAW_Q(y,Y); 411 1.1 mrg FP_PACK_RAW_Q(z,Z); 412 1.1 mrg FP_HANDLE_EXCEPTIONS; 413 1.1 mrg 414 1.1 mrg /* Multiply. */ 415 1.1 mrg FP_INIT_ROUNDMODE; 416 1.1 mrg FP_UNPACK_Q(X,x); 417 1.1 mrg FP_UNPACK_Q(Y,y); 418 1.1 mrg FP_MUL_Q(U,X,Y); 419 1.1 mrg FP_PACK_Q(u,U); 420 1.1 mrg FP_HANDLE_EXCEPTIONS; 421 1.1 mrg 422 1.1 mrg /* Subtract. */ 423 1.1 mrg FP_INIT_ROUNDMODE; 424 1.1 mrg FP_UNPACK_SEMIRAW_Q(U,u); 425 1.1 mrg FP_UNPACK_SEMIRAW_Q(Z,z); 426 1.1 mrg FP_SUB_Q(V,U,Z); 427 1.1 mrg 428 1.1 mrg /* Truncate quad to double. */ 429 1.1 mrg #if (2 * _FP_W_TYPE_SIZE) < _FP_FRACBITS_Q 430 1.1 mrg V_f[3] &= 0x0007ffff; 431 1.1 mrg FP_TRUNC(D,Q,2,4,R,V); 432 1.1 mrg #else 433 1.1 mrg V_f1 &= 0x0007ffffffffffffL; 434 1.1 mrg FP_TRUNC(D,Q,1,2,R,V); 435 1.1 mrg #endif 436 1.1 mrg FP_PACK_SEMIRAW_D(r,R); 437 1.1 mrg FP_HANDLE_EXCEPTIONS; 438 1.1 mrg 439 1.1 mrg return r; 440 1.1 mrg } 441 1.1 mrg 442 1.1 mrg #endif 443 1.1 mrg 444 1.1 mrg #endif 445
Indexes created Fri May 01 00:23:41 UTC 2026