| blob | 7b7fcf27d0e8409a115d1f39039654f58409beb6 |
1 /*****************************************************************************/
2 /* */
3 /* Routines for Arbitrary Precision Floating-point Arithmetic */
4 /* and Fast Robust Geometric Predicates */
5 /* (predicates.c) */
6 /* */
7 /* May 18, 1996 */
8 /* */
9 /* Placed in the public domain by */
10 /* Jonathan Richard Shewchuk */
11 /* School of Computer Science */
12 /* Carnegie Mellon University */
13 /* 5000 Forbes Avenue */
14 /* Pittsburgh, Pennsylvania 15213-3891 */
15 /* jrs@cs.cmu.edu */
16 /* */
17 /* This file contains C implementation of algorithms for exact addition */
18 /* and multiplication of floating-point numbers, and predicates for */
19 /* robustly performing the orientation and incircle tests used in */
20 /* computational geometry. The algorithms and underlying theory are */
21 /* described in Jonathan Richard Shewchuk. "Adaptive Precision Floating- */
22 /* Point Arithmetic and Fast Robust Geometric Predicates." Technical */
23 /* Report CMU-CS-96-140, School of Computer Science, Carnegie Mellon */
24 /* University, Pittsburgh, Pennsylvania, May 1996. (Submitted to */
25 /* Discrete & Computational Geometry.) */
26 /* */
27 /* This file, the paper listed above, and other information are available */
28 /* from the Web page http://www.cs.cmu.edu/~quake/robust.html . */
29 /* */
30 /*****************************************************************************/
32 /*****************************************************************************/
33 /* */
34 /* Using this code: */
35 /* */
36 /* First, read the short or long version of the paper (from the Web page */
37 /* above). */
38 /* */
39 /* Be sure to call exactinit() once, before calling any of the arithmetic */
40 /* functions or geometric predicates. Also be sure to turn on the */
41 /* optimizer when compiling this file. */
42 /* */
43 /* */
44 /* Several geometric predicates are defined. Their parameters are all */
45 /* points. Each point is an array of two or three floating-point */
46 /* numbers. The geometric predicates, described in the papers, are */
47 /* */
48 /* orient2d(pa, pb, pc) */
49 /* orient2dfast(pa, pb, pc) */
50 /* orient3d(pa, pb, pc, pd) */
51 /* orient3dfast(pa, pb, pc, pd) */
52 /* incircle(pa, pb, pc, pd) */
53 /* incirclefast(pa, pb, pc, pd) */
54 /* insphere(pa, pb, pc, pd, pe) */
55 /* inspherefast(pa, pb, pc, pd, pe) */
56 /* */
57 /* Those with suffix "fast" are approximate, non-robust versions. Those */
58 /* without the suffix are adaptive precision, robust versions. There */
59 /* are also versions with the suffices "exact" and "slow", which are */
60 /* non-adaptive, exact arithmetic versions, which I use only for timings */
61 /* in my arithmetic papers. */
62 /* */
63 /* */
64 /* An expansion is represented by an array of floating-point numbers, */
65 /* sorted from smallest to largest magnitude (possibly with interspersed */
66 /* zeros). The length of each expansion is stored as a separate integer, */
67 /* and each arithmetic function returns an integer which is the length */
68 /* of the expansion it created. */
69 /* */
70 /* Several arithmetic functions are defined. Their parameters are */
71 /* */
72 /* e, f Input expansions */
73 /* elen, flen Lengths of input expansions (must be >= 1) */
74 /* h Output expansion */
75 /* b Input scalar */
76 /* */
77 /* The arithmetic functions are */
78 /* */
79 /* grow_expansion(elen, e, b, h) */
80 /* grow_expansion_zeroelim(elen, e, b, h) */
81 /* expansion_sum(elen, e, flen, f, h) */
82 /* expansion_sum_zeroelim1(elen, e, flen, f, h) */
83 /* expansion_sum_zeroelim2(elen, e, flen, f, h) */
84 /* fast_expansion_sum(elen, e, flen, f, h) */
85 /* fast_expansion_sum_zeroelim(elen, e, flen, f, h) */
86 /* linear_expansion_sum(elen, e, flen, f, h) */
87 /* linear_expansion_sum_zeroelim(elen, e, flen, f, h) */
88 /* scale_expansion(elen, e, b, h) */
89 /* scale_expansion_zeroelim(elen, e, b, h) */
90 /* compress(elen, e, h) */
91 /* */
92 /* All of these are described in the long version of the paper; some are */
93 /* described in the short version. All return an integer that is the */
94 /* length of h. Those with suffix _zeroelim perform zero elimination, */
95 /* and are recommended over their counterparts. The procedure */
96 /* fast_expansion_sum_zeroelim() (or linear_expansion_sum_zeroelim() on */
97 /* processors that do not use the round-to-even tiebreaking rule) is */
98 /* recommended over expansion_sum_zeroelim(). Each procedure has a */
99 /* little note next to it (in the code below) that tells you whether or */
100 /* not the output expansion may be the same array as one of the input */
101 /* expansions. */
102 /* */
103 /* */
104 /* If you look around below, you'll also find macros for a bunch of */
105 /* simple unrolled arithmetic operations, and procedures for printing */
106 /* expansions (commented out because they don't work with all C */
107 /* compilers) and for generating random floating-point numbers whose */
108 /* significand bits are all random. Most of the macros have undocumented */
109 /* requirements that certain of their parameters should not be the same */
110 /* variable; for safety, better to make sure all the parameters are */
111 /* distinct variables. Feel free to send email to jrs@cs.cmu.edu if you */
112 /* have questions. */
113 /* */
114 /*****************************************************************************/
116 #include <stdio.h>
117 #include <stdlib.h>
118 #include <math.h>
121 /* Use header file generated automatically by predicates_init. */
122 //#define USE_PREDICATES_INIT
124 #ifdef USE_PREDICATES_INIT
128 /* FPU control. We MUST have only double precision (not extended precision) */
131 /* On some machines, the exact arithmetic routines might be defeated by the */
132 /* use of internal extended precision floating-point registers. Sometimes */
133 /* this problem can be fixed by defining certain values to be volatile, */
134 /* thus forcing them to be stored to memory and rounded off. This isn't */
135 /* a great solution, though, as it slows the arithmetic down. */
136 /* */
137 /* To try this out, write "#define INEXACT volatile" below. Normally, */
138 /* however, INEXACT should be defined to be nothing. ("#define INEXACT".) */
141 /* #define INEXACT volatile */
144 #define REALPRINT doubleprint
145 #define REALRAND doublerand
146 #define NARROWRAND narrowdoublerand
147 #define UNIFORMRAND uniformdoublerand
149 /* Which of the following two methods of finding the absolute values is */
150 /* fastest is compiler-dependent. A few compilers can inline and optimize */
151 /* the fabs() call; but most will incur the overhead of a function call, */
152 /* which is disastrously slow. A faster way on IEEE machines might be to */
153 /* mask the appropriate bit, but that's difficult to do in C. */
155 #define Absolute(a) ((a) >= 0.0 ? (a) : -(a))
156 /* #define Absolute(a) fabs(a) */
158 /* Many of the operations are broken up into two pieces, a main part that */
159 /* performs an approximate operation, and a "tail" that computes the */
160 /* roundoff error of that operation. */
161 /* */
162 /* The operations Fast_Two_Sum(), Fast_Two_Diff(), Two_Sum(), Two_Diff(), */
163 /* Split(), and Two_Product() are all implemented as described in the */
164 /* reference. Each of these macros requires certain variables to be */
165 /* defined in the calling routine. The variables `bvirt', `c', `abig', */
166 /* `_i', `_j', `_k', `_l', `_m', and `_n' are declared `INEXACT' because */
167 /* they store the result of an operation that may incur roundoff error. */
168 /* The input parameter `x' (or the highest numbered `x_' parameter) must */
169 /* also be declared `INEXACT'. */
171 #define Fast_Two_Sum_Tail(a, b, x, y) \
172 bvirt = x - a; \
173 y = b - bvirt
175 #define Fast_Two_Sum(a, b, x, y) \
176 x = (REAL) (a + b); \
177 Fast_Two_Sum_Tail(a, b, x, y)
179 #define Fast_Two_Diff_Tail(a, b, x, y) \
180 bvirt = a - x; \
181 y = bvirt - b
183 #define Fast_Two_Diff(a, b, x, y) \
184 x = (REAL) (a - b); \
185 Fast_Two_Diff_Tail(a, b, x, y)
187 #define Two_Sum_Tail(a, b, x, y) \
188 bvirt = (REAL) (x - a); \
189 avirt = x - bvirt; \
190 bround = b - bvirt; \
191 around = a - avirt; \
192 y = around + bround
194 #define Two_Sum(a, b, x, y) \
195 x = (REAL) (a + b); \
196 Two_Sum_Tail(a, b, x, y)
198 #define Two_Diff_Tail(a, b, x, y) \
199 bvirt = (REAL) (a - x); \
200 avirt = x + bvirt; \
201 bround = bvirt - b; \
202 around = a - avirt; \
203 y = around + bround
205 #define Two_Diff(a, b, x, y) \
206 x = (REAL) (a - b); \
207 Two_Diff_Tail(a, b, x, y)
209 #define Split(a, ahi, alo) \
210 c = (REAL) (splitter * a); \
211 abig = (REAL) (c - a); \
212 ahi = c - abig; \
213 alo = a - ahi
215 #define Two_Product_Tail(a, b, x, y) \
216 Split(a, ahi, alo); \
217 Split(b, bhi, blo); \
218 err1 = x - (ahi * bhi); \
219 err2 = err1 - (alo * bhi); \
220 err3 = err2 - (ahi * blo); \
221 y = (alo * blo) - err3
223 #define Two_Product(a, b, x, y) \
224 x = (REAL) (a * b); \
225 Two_Product_Tail(a, b, x, y)
227 /* Two_Product_Presplit() is Two_Product() where one of the inputs has */
228 /* already been split. Avoids redundant splitting. */
230 #define Two_Product_Presplit(a, b, bhi, blo, x, y) \
231 x = (REAL) (a * b); \
232 Split(a, ahi, alo); \
233 err1 = x - (ahi * bhi); \
234 err2 = err1 - (alo * bhi); \
235 err3 = err2 - (ahi * blo); \
236 y = (alo * blo) - err3
238 /* Two_Product_2Presplit() is Two_Product() where both of the inputs have */
239 /* already been split. Avoids redundant splitting. */
241 #define Two_Product_2Presplit(a, ahi, alo, b, bhi, blo, x, y) \
242 x = (REAL) (a * b); \
243 err1 = x - (ahi * bhi); \
244 err2 = err1 - (alo * bhi); \
245 err3 = err2 - (ahi * blo); \
246 y = (alo * blo) - err3
248 /* Square() can be done more quickly than Two_Product(). */
250 #define Square_Tail(a, x, y) \
251 Split(a, ahi, alo); \
252 err1 = x - (ahi * ahi); \
253 err3 = err1 - ((ahi + ahi) * alo); \
254 y = (alo * alo) - err3
256 #define Square(a, x, y) \
257 x = (REAL) (a * a); \
258 Square_Tail(a, x, y)
260 /* Macros for summing expansions of various fixed lengths. These are all */
261 /* unrolled versions of Expansion_Sum(). */
263 #define Two_One_Sum(a1, a0, b, x2, x1, x0) \
264 Two_Sum(a0, b , _i, x0); \
265 Two_Sum(a1, _i, x2, x1)
267 #define Two_One_Diff(a1, a0, b, x2, x1, x0) \
268 Two_Diff(a0, b , _i, x0); \
269 Two_Sum( a1, _i, x2, x1)
271 #define Two_Two_Sum(a1, a0, b1, b0, x3, x2, x1, x0) \
272 Two_One_Sum(a1, a0, b0, _j, _0, x0); \
273 Two_One_Sum(_j, _0, b1, x3, x2, x1)
275 #define Two_Two_Diff(a1, a0, b1, b0, x3, x2, x1, x0) \
276 Two_One_Diff(a1, a0, b0, _j, _0, x0); \
277 Two_One_Diff(_j, _0, b1, x3, x2, x1)
279 #define Four_One_Sum(a3, a2, a1, a0, b, x4, x3, x2, x1, x0) \
280 Two_One_Sum(a1, a0, b , _j, x1, x0); \
281 Two_One_Sum(a3, a2, _j, x4, x3, x2)
283 #define Four_Two_Sum(a3, a2, a1, a0, b1, b0, x5, x4, x3, x2, x1, x0) \
284 Four_One_Sum(a3, a2, a1, a0, b0, _k, _2, _1, _0, x0); \
285 Four_One_Sum(_k, _2, _1, _0, b1, x5, x4, x3, x2, x1)
287 #define Four_Four_Sum(a3, a2, a1, a0, b4, b3, b1, b0, x7, x6, x5, x4, x3, x2, \
288 x1, x0) \
289 Four_Two_Sum(a3, a2, a1, a0, b1, b0, _l, _2, _1, _0, x1, x0); \
290 Four_Two_Sum(_l, _2, _1, _0, b4, b3, x7, x6, x5, x4, x3, x2)
292 #define Eight_One_Sum(a7, a6, a5, a4, a3, a2, a1, a0, b, x8, x7, x6, x5, x4, \
293 x3, x2, x1, x0) \
294 Four_One_Sum(a3, a2, a1, a0, b , _j, x3, x2, x1, x0); \
295 Four_One_Sum(a7, a6, a5, a4, _j, x8, x7, x6, x5, x4)
297 #define Eight_Two_Sum(a7, a6, a5, a4, a3, a2, a1, a0, b1, b0, x9, x8, x7, \
298 x6, x5, x4, x3, x2, x1, x0) \
299 Eight_One_Sum(a7, a6, a5, a4, a3, a2, a1, a0, b0, _k, _6, _5, _4, _3, _2, \
300 _1, _0, x0); \
301 Eight_One_Sum(_k, _6, _5, _4, _3, _2, _1, _0, b1, x9, x8, x7, x6, x5, x4, \
302 x3, x2, x1)
304 #define Eight_Four_Sum(a7, a6, a5, a4, a3, a2, a1, a0, b4, b3, b1, b0, x11, \
305 x10, x9, x8, x7, x6, x5, x4, x3, x2, x1, x0) \
306 Eight_Two_Sum(a7, a6, a5, a4, a3, a2, a1, a0, b1, b0, _l, _6, _5, _4, _3, \
307 _2, _1, _0, x1, x0); \
308 Eight_Two_Sum(_l, _6, _5, _4, _3, _2, _1, _0, b4, b3, x11, x10, x9, x8, \
309 x7, x6, x5, x4, x3, x2)
311 /* Macros for multiplying expansions of various fixed lengths. */
313 #define Two_One_Product(a1, a0, b, x3, x2, x1, x0) \
314 Split(b, bhi, blo); \
315 Two_Product_Presplit(a0, b, bhi, blo, _i, x0); \
316 Two_Product_Presplit(a1, b, bhi, blo, _j, _0); \
317 Two_Sum(_i, _0, _k, x1); \
318 Fast_Two_Sum(_j, _k, x3, x2)
320 #define Four_One_Product(a3, a2, a1, a0, b, x7, x6, x5, x4, x3, x2, x1, x0) \
321 Split(b, bhi, blo); \
322 Two_Product_Presplit(a0, b, bhi, blo, _i, x0); \
323 Two_Product_Presplit(a1, b, bhi, blo, _j, _0); \
324 Two_Sum(_i, _0, _k, x1); \
325 Fast_Two_Sum(_j, _k, _i, x2); \
326 Two_Product_Presplit(a2, b, bhi, blo, _j, _0); \
327 Two_Sum(_i, _0, _k, x3); \
328 Fast_Two_Sum(_j, _k, _i, x4); \
329 Two_Product_Presplit(a3, b, bhi, blo, _j, _0); \
330 Two_Sum(_i, _0, _k, x5); \
331 Fast_Two_Sum(_j, _k, x7, x6)
333 #define Two_Two_Product(a1, a0, b1, b0, x7, x6, x5, x4, x3, x2, x1, x0) \
334 Split(a0, a0hi, a0lo); \
335 Split(b0, bhi, blo); \
336 Two_Product_2Presplit(a0, a0hi, a0lo, b0, bhi, blo, _i, x0); \
337 Split(a1, a1hi, a1lo); \
338 Two_Product_2Presplit(a1, a1hi, a1lo, b0, bhi, blo, _j, _0); \
339 Two_Sum(_i, _0, _k, _1); \
340 Fast_Two_Sum(_j, _k, _l, _2); \
341 Split(b1, bhi, blo); \
342 Two_Product_2Presplit(a0, a0hi, a0lo, b1, bhi, blo, _i, _0); \
343 Two_Sum(_1, _0, _k, x1); \
344 Two_Sum(_2, _k, _j, _1); \
345 Two_Sum(_l, _j, _m, _2); \
346 Two_Product_2Presplit(a1, a1hi, a1lo, b1, bhi, blo, _j, _0); \
347 Two_Sum(_i, _0, _n, _0); \
348 Two_Sum(_1, _0, _i, x2); \
349 Two_Sum(_2, _i, _k, _1); \
350 Two_Sum(_m, _k, _l, _2); \
351 Two_Sum(_j, _n, _k, _0); \
352 Two_Sum(_1, _0, _j, x3); \
353 Two_Sum(_2, _j, _i, _1); \
354 Two_Sum(_l, _i, _m, _2); \
355 Two_Sum(_1, _k, _i, x4); \
356 Two_Sum(_2, _i, _k, x5); \
357 Two_Sum(_m, _k, x7, x6)
359 /* An expansion of length two can be squared more quickly than finding the */
360 /* product of two different expansions of length two, and the result is */
361 /* guaranteed to have no more than six (rather than eight) components. */
363 #define Two_Square(a1, a0, x5, x4, x3, x2, x1, x0) \
364 Square(a0, _j, x0); \
365 _0 = a0 + a0; \
366 Two_Product(a1, _0, _k, _1); \
367 Two_One_Sum(_k, _1, _j, _l, _2, x1); \
368 Square(a1, _j, _1); \
369 Two_Two_Sum(_j, _1, _l, _2, x5, x4, x3, x2)
371 #ifndef USE_PREDICATES_INIT
374 /* A set of coefficients used to calculate maximum roundoff errors. */
381 void
383 {
387 /* epsilon = 2^(-p). Used to estimate roundoff errors. */
390 FPU_ROUND_DOUBLE;
394 /* Repeatedly divide `epsilon' by two until it is too small to add to */
395 /* one without causing roundoff. (Also check if the sum is equal to */
396 /* the previous sum, for machines that round up instead of using exact */
397 /* rounding. Not that this library will work on such machines anyway). */
403 }
408 /* Error bounds for orientation and incircle tests. */
424 FPU_RESTORE;
425 }
429 /*****************************************************************************/
430 /* */
431 /* doubleprint() Print the bit representation of a double. */
432 /* */
433 /* Useful for debugging exact arithmetic routines. */
434 /* */
435 /*****************************************************************************/
437 /*
438 void doubleprint(number)
439 double number;
440 {
441 unsigned long long no;
442 unsigned long long sign, expo;
443 int exponent;
444 int i, bottomi;
446 no = *(unsigned long long *) &number;
447 sign = no & 0x8000000000000000ll;
448 expo = (no >> 52) & 0x7ffll;
449 exponent = (int) expo;
450 exponent = exponent - 1023;
451 if (sign) {
452 printf("-");
453 } else {
454 printf(" ");
455 }
456 if (exponent == -1023) {
457 printf(
458 "0.0000000000000000000000000000000000000000000000000000_ ( )");
459 } else {
460 printf("1.");
461 bottomi = -1;
462 for (i = 0; i < 52; i++) {
463 if (no & 0x0008000000000000ll) {
464 printf("1");
465 bottomi = i;
466 } else {
467 printf("0");
468 }
469 no <<= 1;
470 }
471 printf("_%d (%d)", exponent, exponent - 1 - bottomi);
472 }
473 }
474 */
476 /*****************************************************************************/
477 /* */
478 /* floatprint() Print the bit representation of a float. */
479 /* */
480 /* Useful for debugging exact arithmetic routines. */
481 /* */
482 /*****************************************************************************/
484 /*
485 void floatprint(number)
486 float number;
487 {
488 unsigned no;
489 unsigned sign, expo;
490 int exponent;
491 int i, bottomi;
493 no = *(unsigned *) &number;
494 sign = no & 0x80000000;
495 expo = (no >> 23) & 0xff;
496 exponent = (int) expo;
497 exponent = exponent - 127;
498 if (sign) {
499 printf("-");
500 } else {
501 printf(" ");
502 }
503 if (exponent == -127) {
504 printf("0.00000000000000000000000_ ( )");
505 } else {
506 printf("1.");
507 bottomi = -1;
508 for (i = 0; i < 23; i++) {
509 if (no & 0x00400000) {
510 printf("1");
511 bottomi = i;
512 } else {
513 printf("0");
514 }
515 no <<= 1;
516 }
517 printf("_%3d (%3d)", exponent, exponent - 1 - bottomi);
518 }
519 }
520 */
522 /*****************************************************************************/
523 /* */
524 /* expansion_print() Print the bit representation of an expansion. */
525 /* */
526 /* Useful for debugging exact arithmetic routines. */
527 /* */
528 /*****************************************************************************/
530 /*
531 void expansion_print(elen, e)
532 int elen;
533 REAL *e;
534 {
535 int i;
537 for (i = elen - 1; i >= 0; i--) {
538 REALPRINT(e[i]);
539 if (i > 0) {
540 printf(" +\n");
541 } else {
542 printf("\n");
543 }
544 }
545 }
546 */
548 /*****************************************************************************/
549 /* */
550 /* doublerand() Generate a double with random 53-bit significand and a */
551 /* random exponent in [0, 511]. */
552 /* */
553 /*****************************************************************************/
555 /*
556 static double doublerand()
557 {
558 double result;
559 double expo;
560 long a, b, c;
561 long i;
563 a = random();
564 b = random();
565 c = random();
566 result = (double) (a - 1073741824) * 8388608.0 + (double) (b >> 8);
567 for (i = 512, expo = 2; i <= 131072; i *= 2, expo = expo * expo) {
568 if (c & i) {
569 result *= expo;
570 }
571 }
572 return result;
573 }
574 */
576 /*****************************************************************************/
577 /* */
578 /* narrowdoublerand() Generate a double with random 53-bit significand */
579 /* and a random exponent in [0, 7]. */
580 /* */
581 /*****************************************************************************/
583 /*
584 static double narrowdoublerand()
585 {
586 double result;
587 double expo;
588 long a, b, c;
589 long i;
591 a = random();
592 b = random();
593 c = random();
594 result = (double) (a - 1073741824) * 8388608.0 + (double) (b >> 8);
595 for (i = 512, expo = 2; i <= 2048; i *= 2, expo = expo * expo) {
596 if (c & i) {
597 result *= expo;
598 }
599 }
600 return result;
601 }
602 */
604 /*****************************************************************************/
605 /* */
606 /* uniformdoublerand() Generate a double with random 53-bit significand. */
607 /* */
608 /*****************************************************************************/
610 /*
611 static double uniformdoublerand()
612 {
613 double result;
614 long a, b;
616 a = random();
617 b = random();
618 result = (double) (a - 1073741824) * 8388608.0 + (double) (b >> 8);
619 return result;
620 }
621 */
623 /*****************************************************************************/
624 /* */
625 /* floatrand() Generate a float with random 24-bit significand and a */
626 /* random exponent in [0, 63]. */
627 /* */
628 /*****************************************************************************/
630 /*
631 static float floatrand()
632 {
633 float result;
634 float expo;
635 long a, c;
636 long i;
638 a = random();
639 c = random();
640 result = (float) ((a - 1073741824) >> 6);
641 for (i = 512, expo = 2; i <= 16384; i *= 2, expo = expo * expo) {
642 if (c & i) {
643 result *= expo;
644 }
645 }
646 return result;
647 }
648 */
650 /*****************************************************************************/
651 /* */
652 /* narrowfloatrand() Generate a float with random 24-bit significand and */
653 /* a random exponent in [0, 7]. */
654 /* */
655 /*****************************************************************************/
657 /*
658 static float narrowfloatrand()
659 {
660 float result;
661 float expo;
662 long a, c;
663 long i;
665 a = random();
666 c = random();
667 result = (float) ((a - 1073741824) >> 6);
668 for (i = 512, expo = 2; i <= 2048; i *= 2, expo = expo * expo) {
669 if (c & i) {
670 result *= expo;
671 }
672 }
673 return result;
674 }
675 */
677 /*****************************************************************************/
678 /* */
679 /* uniformfloatrand() Generate a float with random 24-bit significand. */
680 /* */
681 /*****************************************************************************/
683 /*
684 static float uniformfloatrand()
685 {
686 float result;
687 long a;
689 a = random();
690 result = (float) ((a - 1073741824) >> 6);
691 return result;
692 }
693 */
695 /*****************************************************************************/
696 /* */
697 /* fast_expansion_sum_zeroelim() Sum two expansions, eliminating zero */
698 /* components from the output expansion. */
699 /* */
700 /* Sets h = e + f. See the long version of my paper for details. */
701 /* */
702 /* If round-to-even is used (as with IEEE 754), maintains the strongly */
703 /* nonoverlapping property. (That is, if e is strongly nonoverlapping, h */
704 /* will be also.) Does NOT maintain the nonoverlapping or nonadjacent */
705 /* properties. */
706 /* */
707 /*****************************************************************************/
711 /* h cannot be e or f. */
712 {
713 REAL Q;
714 INEXACT REAL Qnew;
715 INEXACT REAL hh;
716 INEXACT REAL bvirt;
730 }
739 }
743 }
751 }
755 }
756 }
757 }
764 }
765 }
772 }
773 }
776 }
778 }
780 /*****************************************************************************/
781 /* */
782 /* scale_expansion_zeroelim() Multiply an expansion by a scalar, */
783 /* eliminating zero components from the */
784 /* output expansion. */
785 /* */
786 /* Sets h = be. See either version of my paper for details. */
787 /* */
788 /* Maintains the nonoverlapping property. If round-to-even is used (as */
789 /* with IEEE 754), maintains the strongly nonoverlapping and nonadjacent */
790 /* properties as well. (That is, if e has one of these properties, so */
791 /* will h.) */
792 /* */
793 /*****************************************************************************/
796 /* e and h cannot be the same. */
797 {
799 REAL hh;
800 INEXACT REAL product1;
801 REAL product0;
803 REAL enow;
804 INEXACT REAL bvirt;
806 INEXACT REAL c;
807 INEXACT REAL abig;
816 }
823 }
827 }
828 }
831 }
833 }
835 /*****************************************************************************/
836 /* */
837 /* estimate() Produce a one-word estimate of an expansion's value. */
838 /* */
839 /* See either version of my paper for details. */
840 /* */
841 /*****************************************************************************/
844 {
845 REAL Q;
851 }
853 }
855 /*****************************************************************************/
856 /* */
857 /* orient2dfast() Approximate 2D orientation test. Nonrobust. */
858 /* orient2dexact() Exact 2D orientation test. Robust. */
859 /* orient2dslow() Another exact 2D orientation test. Robust. */
860 /* orient2d() Adaptive exact 2D orientation test. Robust. */
861 /* */
862 /* Return a positive value if the points pa, pb, and pc occur */
863 /* in counterclockwise order; a negative value if they occur */
864 /* in clockwise order; and zero if they are collinear. The */
865 /* result is also a rough approximation of twice the signed */
866 /* area of the triangle defined by the three points. */
867 /* */
868 /* Only the first and last routine should be used; the middle two are for */
869 /* timings. */
870 /* */
871 /* The last three use exact arithmetic to ensure a correct answer. The */
872 /* result returned is the determinant of a matrix. In orient2d() only, */
873 /* this determinant is computed adaptively, in the sense that exact */
874 /* arithmetic is used only to the degree it is needed to ensure that the */
875 /* returned value has the correct sign. Hence, orient2d() is usually quite */
876 /* fast, but will run more slowly when the input points are collinear or */
877 /* nearly so. */
878 /* */
879 /*****************************************************************************/
882 {
889 INEXACT REAL B3;
892 INEXACT REAL u3;
896 INEXACT REAL bvirt;
898 INEXACT REAL c;
899 INEXACT REAL abig;
903 REAL _0;
921 }
931 }
938 }
959 }
965 {
968 REAL orient;
970 FPU_ROUND_DOUBLE;
978 FPU_RESTORE;
982 }
985 FPU_RESTORE;
989 }
991 FPU_RESTORE;
993 }
997 FPU_RESTORE;
999 }
1002 FPU_RESTORE;
1004 }
1006 /*****************************************************************************/
1007 /* */
1008 /* orient3dfast() Approximate 3D orientation test. Nonrobust. */
1009 /* orient3dexact() Exact 3D orientation test. Robust. */
1010 /* orient3dslow() Another exact 3D orientation test. Robust. */
1011 /* orient3d() Adaptive exact 3D orientation test. Robust. */
1012 /* */
1013 /* Return a positive value if the point pd lies below the */
1014 /* plane passing through pa, pb, and pc; "below" is defined so */
1015 /* that pa, pb, and pc appear in counterclockwise order when */
1016 /* viewed from above the plane. Returns a negative value if */
1017 /* pd lies above the plane. Returns zero if the points are */
1018 /* coplanar. The result is also a rough approximation of six */
1019 /* times the signed volume of the tetrahedron defined by the */
1020 /* four points. */
1021 /* */
1022 /* Only the first and last routine should be used; the middle two are for */
1023 /* timings. */
1024 /* */
1025 /* The last three use exact arithmetic to ensure a correct answer. The */
1026 /* result returned is the determinant of a matrix. In orient3d() only, */
1027 /* this determinant is computed adaptively, in the sense that exact */
1028 /* arithmetic is used only to the degree it is needed to ensure that the */
1029 /* returned value has the correct sign. Hence, orient3d() is usually quite */
1030 /* fast, but will run more slowly when the input points are coplanar or */
1031 /* nearly so. */
1032 /* */
1033 /*****************************************************************************/
1036 REAL permanent)
1037 {
1076 INEXACT REAL u3;
1078 REAL negate;
1080 INEXACT REAL bvirt;
1082 INEXACT REAL c;
1083 INEXACT REAL abig;
1087 REAL _0;
1124 }
1140 }
1154 }
1173 }
1196 }
1197 }
1212 }
1235 }
1236 }
1251 }
1274 }
1275 }
1280 finother);
1286 finother);
1292 finother);
1298 finother);
1300 }
1304 finother);
1306 }
1310 finother);
1312 }
1320 finother);
1326 finother);
1328 }
1329 }
1336 finother);
1342 finother);
1344 }
1345 }
1346 }
1353 finother);
1359 finother);
1361 }
1362 }
1369 finother);
1375 finother);
1377 }
1378 }
1379 }
1386 finother);
1392 finother);
1394 }
1395 }
1402 finother);
1408 finother);
1410 }
1411 }
1412 }
1417 finother);
1419 }
1423 finother);
1425 }
1429 finother);
1431 }
1434 }
1441 {
1444 REAL det;
1446 REAL orient;
1448 FPU_ROUND_DOUBLE;
1478 FPU_RESTORE;
1480 }
1483 FPU_RESTORE;
1485 }
1487 /*****************************************************************************/
1488 /* */
1489 /* incirclefast() Approximate 2D incircle test. Nonrobust. */
1490 /* incircleexact() Exact 2D incircle test. Robust. */
1491 /* incircleslow() Another exact 2D incircle test. Robust. */
1492 /* incircle() Adaptive exact 2D incircle test. Robust. */
1493 /* */
1494 /* Return a positive value if the point pd lies inside the */
1495 /* circle passing through pa, pb, and pc; a negative value if */
1496 /* it lies outside; and zero if the four points are cocircular.*/
1497 /* The points pa, pb, and pc must be in counterclockwise */
1498 /* order, or the sign of the result will be reversed. */
1499 /* */
1500 /* Only the first and last routine should be used; the middle two are for */
1501 /* timings. */
1502 /* */
1503 /* The last three use exact arithmetic to ensure a correct answer. The */
1504 /* result returned is the determinant of a matrix. In incircle() only, */
1505 /* this determinant is computed adaptively, in the sense that exact */
1506 /* arithmetic is used only to the degree it is needed to ensure that the */
1507 /* returned value has the correct sign. Hence, incircle() is usually quite */
1508 /* fast, but will run more slowly when the input points are cocircular or */
1509 /* nearly so. */
1510 /* */
1511 /*****************************************************************************/
1514 REAL permanent)
1515 {
1568 REAL negate;
1570 INEXACT REAL bvirt;
1572 INEXACT REAL c;
1573 INEXACT REAL abig;
1577 REAL _0;
1623 }
1634 }
1648 }
1659 }
1666 }
1673 }
1678 temp16a);
1693 }
1697 temp16a);
1712 }
1716 temp16a);
1731 }
1735 temp16a);
1750 }
1754 temp16a);
1769 }
1773 temp16a);
1788 }
1815 }
1821 temp32a);
1830 temp16a);
1834 }
1838 temp16a);
1842 }
1845 temp32a);
1848 temp16a);
1850 temp16b);
1858 }
1863 temp32a);
1872 temp32a);
1875 temp16a);
1877 temp16b);
1885 }
1886 }
1912 }
1918 temp32a);
1927 temp16a);
1931 }
1935 temp16a);
1939 }
1942 temp32a);
1945 temp16a);
1947 temp16b);
1955 }
1960 temp32a);
1969 temp32a);
1972 temp16a);
1974 temp16b);
1982 }
1983 }
2009 }
2015 temp32a);
2024 temp16a);
2028 }
2032 temp16a);
2036 }
2039 temp32a);
2042 temp16a);
2044 temp16b);
2052 }
2057 temp32a);
2066 temp32a);
2069 temp16a);
2071 temp16b);
2079 }
2080 }
2083 }
2090 {
2094 REAL det;
2096 REAL inc;
2098 FPU_ROUND_DOUBLE;
2128 FPU_RESTORE;
2130 }
2133 FPU_RESTORE;
2135 }
2137 /*****************************************************************************/
2138 /* */
2139 /* inspherefast() Approximate 3D insphere test. Nonrobust. */
2140 /* insphereexact() Exact 3D insphere test. Robust. */
2141 /* insphereslow() Another exact 3D insphere test. Robust. */
2142 /* insphere() Adaptive exact 3D insphere test. Robust. */
2143 /* */
2144 /* Return a positive value if the point pe lies inside the */
2145 /* sphere passing through pa, pb, pc, and pd; a negative value */
2146 /* if it lies outside; and zero if the five points are */
2147 /* cospherical. The points pa, pb, pc, and pd must be ordered */
2148 /* so that they have a positive orientation (as defined by */
2149 /* orient3d()), or the sign of the result will be reversed. */
2150 /* */
2151 /* Only the first and last routine should be used; the middle two are for */
2152 /* timings. */
2153 /* */
2154 /* The last three use exact arithmetic to ensure a correct answer. The */
2155 /* result returned is the determinant of a matrix. In insphere() only, */
2156 /* this determinant is computed adaptively, in the sense that exact */
2157 /* arithmetic is used only to the degree it is needed to ensure that the */
2158 /* returned value has the correct sign. Hence, insphere() is usually quite */
2159 /* fast, but will run more slowly when the input points are cospherical or */
2160 /* nearly so. */
2161 /* */
2162 /*****************************************************************************/
2165 {
2199 INEXACT REAL bvirt;
2201 INEXACT REAL c;
2202 INEXACT REAL abig;
2206 REAL _0;
2251 temp16);
2254 abc);
2259 temp16);
2262 bcd);
2267 temp16);
2270 cde);
2275 temp16);
2278 dea);
2283 temp16);
2286 eab);
2291 temp16);
2294 abd);
2299 temp16);
2302 bce);
2307 temp16);
2310 cda);
2315 temp16);
2318 deb);
2323 temp16);
2326 eac);
2332 }
2348 }
2364 }
2380 }
2396 }
2414 }
2417 REAL permanent)
2418 {
2446 INEXACT REAL bvirt;
2448 INEXACT REAL c;
2449 INEXACT REAL abig;
2453 REAL _0;
2570 }
2589 }
2626 }
2629 }
2637 {
2650 REAL det;
2652 REAL ins;
2654 FPU_ROUND_DOUBLE;
2720 * alift
2724 * blift
2728 * clift
2735 FPU_RESTORE;
2737 }
2740 FPU_RESTORE;
2742 }