1 /* crypto/bn/bn_gf2m.c */
2 /* ====================================================================
3 * Copyright 2002 Sun Microsystems, Inc. ALL RIGHTS RESERVED.
4 *
5 * The Elliptic Curve Public-Key Crypto Library (ECC Code) included
6 * herein is developed by SUN MICROSYSTEMS, INC., and is contributed
7 * to the OpenSSL project.
8 *
9 * The ECC Code is licensed pursuant to the OpenSSL open source
10 * license provided below.
11 *
12 * In addition, Sun covenants to all licensees who provide a reciprocal
13 * covenant with respect to their own patents if any, not to sue under
14 * current and future patent claims necessarily infringed by the making,
15 * using, practicing, selling, offering for sale and/or otherwise
16 * disposing of the ECC Code as delivered hereunder (or portions thereof),
17 * provided that such covenant shall not apply:
18 * 1) for code that a licensee deletes from the ECC Code;
19 * 2) separates from the ECC Code; or
20 * 3) for infringements caused by:
21 * i) the modification of the ECC Code or
22 * ii) the combination of the ECC Code with other software or
23 * devices where such combination causes the infringement.
24 *
25 * The software is originally written by Sheueling Chang Shantz and
26 * Douglas Stebila of Sun Microsystems Laboratories.
27 *
28 */
29
30 /*
31 * NOTE: This file is licensed pursuant to the OpenSSL license below and may
32 * be modified; but after modifications, the above covenant may no longer
33 * apply! In such cases, the corresponding paragraph ["In addition, Sun
34 * covenants ... causes the infringement."] and this note can be edited out;
35 * but please keep the Sun copyright notice and attribution.
36 */
37
38 /* ====================================================================
39 * Copyright (c) 1998-2002 The OpenSSL Project. All rights reserved.
40 *
41 * Redistribution and use in source and binary forms, with or without
42 * modification, are permitted provided that the following conditions
43 * are met:
44 *
45 * 1. Redistributions of source code must retain the above copyright
46 * notice, this list of conditions and the following disclaimer.
47 *
48 * 2. Redistributions in binary form must reproduce the above copyright
49 * notice, this list of conditions and the following disclaimer in
50 * the documentation and/or other materials provided with the
51 * distribution.
52 *
53 * 3. All advertising materials mentioning features or use of this
54 * software must display the following acknowledgment:
55 * "This product includes software developed by the OpenSSL Project
56 * for use in the OpenSSL Toolkit. (http://www.openssl.org/)"
57 *
58 * 4. The names "OpenSSL Toolkit" and "OpenSSL Project" must not be used to
59 * endorse or promote products derived from this software without
60 * prior written permission. For written permission, please contact
61 * openssl-core@openssl.org.
62 *
63 * 5. Products derived from this software may not be called "OpenSSL"
64 * nor may "OpenSSL" appear in their names without prior written
65 * permission of the OpenSSL Project.
66 *
67 * 6. Redistributions of any form whatsoever must retain the following
68 * acknowledgment:
69 * "This product includes software developed by the OpenSSL Project
70 * for use in the OpenSSL Toolkit (http://www.openssl.org/)"
71 *
72 * THIS SOFTWARE IS PROVIDED BY THE OpenSSL PROJECT ``AS IS'' AND ANY
73 * EXPRESSED OR IMPLIED WARRANTIES, INCLUDING, BUT NOT LIMITED TO, THE
74 * IMPLIED WARRANTIES OF MERCHANTABILITY AND FITNESS FOR A PARTICULAR
75 * PURPOSE ARE DISCLAIMED. IN NO EVENT SHALL THE OpenSSL PROJECT OR
76 * ITS CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL,
77 * SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT
78 * NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES;
79 * LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION)
80 * HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN CONTRACT,
81 * STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR OTHERWISE)
82 * ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, EVEN IF ADVISED
83 * OF THE POSSIBILITY OF SUCH DAMAGE.
84 * ====================================================================
85 *
86 * This product includes cryptographic software written by Eric Young
87 * (eay@cryptsoft.com). This product includes software written by Tim
88 * Hudson (tjh@cryptsoft.com).
89 *
90 */
91
92 #include <assert.h>
93 #include <limits.h>
94 #include <stdio.h>
95 #include "cryptlib.h"
96 #include "bn_lcl.h"
97
98 /*
99 * Maximum number of iterations before BN_GF2m_mod_solve_quad_arr should
100 * fail.
101 */
102 #define MAX_ITERATIONS 50
103
104 static const BN_ULONG SQR_tb[16] = { 0, 1, 4, 5, 16, 17, 20, 21,
105 64, 65, 68, 69, 80, 81, 84, 85
106 };
107
108 /* Platform-specific macros to accelerate squaring. */
109 #if defined(SIXTY_FOUR_BIT) || defined(SIXTY_FOUR_BIT_LONG)
110 # define SQR1(w) \
111 SQR_tb[(w) >> 60 & 0xF] << 56 | SQR_tb[(w) >> 56 & 0xF] << 48 | \
112 SQR_tb[(w) >> 52 & 0xF] << 40 | SQR_tb[(w) >> 48 & 0xF] << 32 | \
113 SQR_tb[(w) >> 44 & 0xF] << 24 | SQR_tb[(w) >> 40 & 0xF] << 16 | \
114 SQR_tb[(w) >> 36 & 0xF] << 8 | SQR_tb[(w) >> 32 & 0xF]
115 # define SQR0(w) \
116 SQR_tb[(w) >> 28 & 0xF] << 56 | SQR_tb[(w) >> 24 & 0xF] << 48 | \
117 SQR_tb[(w) >> 20 & 0xF] << 40 | SQR_tb[(w) >> 16 & 0xF] << 32 | \
118 SQR_tb[(w) >> 12 & 0xF] << 24 | SQR_tb[(w) >> 8 & 0xF] << 16 | \
119 SQR_tb[(w) >> 4 & 0xF] << 8 | SQR_tb[(w) & 0xF]
120 #endif
121 #ifdef THIRTY_TWO_BIT
122 # define SQR1(w) \
123 SQR_tb[(w) >> 28 & 0xF] << 24 | SQR_tb[(w) >> 24 & 0xF] << 16 | \
124 SQR_tb[(w) >> 20 & 0xF] << 8 | SQR_tb[(w) >> 16 & 0xF]
125 # define SQR0(w) \
126 SQR_tb[(w) >> 12 & 0xF] << 24 | SQR_tb[(w) >> 8 & 0xF] << 16 | \
127 SQR_tb[(w) >> 4 & 0xF] << 8 | SQR_tb[(w) & 0xF]
128 #endif
129 #ifdef SIXTEEN_BIT
130 # define SQR1(w) \
131 SQR_tb[(w) >> 12 & 0xF] << 8 | SQR_tb[(w) >> 8 & 0xF]
132 # define SQR0(w) \
133 SQR_tb[(w) >> 4 & 0xF] << 8 | SQR_tb[(w) & 0xF]
134 #endif
135 #ifdef EIGHT_BIT
136 # define SQR1(w) \
137 SQR_tb[(w) >> 4 & 0xF]
138 # define SQR0(w) \
139 SQR_tb[(w) & 15]
140 #endif
141
142 /*
143 * Product of two polynomials a, b each with degree < BN_BITS2 - 1, result is
144 * a polynomial r with degree < 2 * BN_BITS - 1 The caller MUST ensure that
145 * the variables have the right amount of space allocated.
146 */
147 #ifdef EIGHT_BIT
bn_GF2m_mul_1x1(BN_ULONG * r1,BN_ULONG * r0,const BN_ULONG a,const BN_ULONG b)148 static void bn_GF2m_mul_1x1(BN_ULONG *r1, BN_ULONG *r0, const BN_ULONG a,
149 const BN_ULONG b)
150 {
151 register BN_ULONG h, l, s;
152 BN_ULONG tab[4], top1b = a >> 7;
153 register BN_ULONG a1, a2;
154
155 a1 = a & (0x7F);
156 a2 = a1 << 1;
157
158 tab[0] = 0;
159 tab[1] = a1;
160 tab[2] = a2;
161 tab[3] = a1 ^ a2;
162
163 s = tab[b & 0x3];
164 l = s;
165 s = tab[b >> 2 & 0x3];
166 l ^= s << 2;
167 h = s >> 6;
168 s = tab[b >> 4 & 0x3];
169 l ^= s << 4;
170 h ^= s >> 4;
171 s = tab[b >> 6];
172 l ^= s << 6;
173 h ^= s >> 2;
174
175 /* compensate for the top bit of a */
176
177 if (top1b & 01) {
178 l ^= b << 7;
179 h ^= b >> 1;
180 }
181
182 *r1 = h;
183 *r0 = l;
184 }
185 #endif
186 #ifdef SIXTEEN_BIT
bn_GF2m_mul_1x1(BN_ULONG * r1,BN_ULONG * r0,const BN_ULONG a,const BN_ULONG b)187 static void bn_GF2m_mul_1x1(BN_ULONG *r1, BN_ULONG *r0, const BN_ULONG a,
188 const BN_ULONG b)
189 {
190 register BN_ULONG h, l, s;
191 BN_ULONG tab[4], top1b = a >> 15;
192 register BN_ULONG a1, a2;
193
194 a1 = a & (0x7FFF);
195 a2 = a1 << 1;
196
197 tab[0] = 0;
198 tab[1] = a1;
199 tab[2] = a2;
200 tab[3] = a1 ^ a2;
201
202 s = tab[b & 0x3];
203 l = s;
204 s = tab[b >> 2 & 0x3];
205 l ^= s << 2;
206 h = s >> 14;
207 s = tab[b >> 4 & 0x3];
208 l ^= s << 4;
209 h ^= s >> 12;
210 s = tab[b >> 6 & 0x3];
211 l ^= s << 6;
212 h ^= s >> 10;
213 s = tab[b >> 8 & 0x3];
214 l ^= s << 8;
215 h ^= s >> 8;
216 s = tab[b >> 10 & 0x3];
217 l ^= s << 10;
218 h ^= s >> 6;
219 s = tab[b >> 12 & 0x3];
220 l ^= s << 12;
221 h ^= s >> 4;
222 s = tab[b >> 14];
223 l ^= s << 14;
224 h ^= s >> 2;
225
226 /* compensate for the top bit of a */
227
228 if (top1b & 01) {
229 l ^= b << 15;
230 h ^= b >> 1;
231 }
232
233 *r1 = h;
234 *r0 = l;
235 }
236 #endif
237 #ifdef THIRTY_TWO_BIT
bn_GF2m_mul_1x1(BN_ULONG * r1,BN_ULONG * r0,const BN_ULONG a,const BN_ULONG b)238 static void bn_GF2m_mul_1x1(BN_ULONG *r1, BN_ULONG *r0, const BN_ULONG a,
239 const BN_ULONG b)
240 {
241 register BN_ULONG h, l, s;
242 BN_ULONG tab[8], top2b = a >> 30;
243 register BN_ULONG a1, a2, a4;
244
245 a1 = a & (0x3FFFFFFF);
246 a2 = a1 << 1;
247 a4 = a2 << 1;
248
249 tab[0] = 0;
250 tab[1] = a1;
251 tab[2] = a2;
252 tab[3] = a1 ^ a2;
253 tab[4] = a4;
254 tab[5] = a1 ^ a4;
255 tab[6] = a2 ^ a4;
256 tab[7] = a1 ^ a2 ^ a4;
257
258 s = tab[b & 0x7];
259 l = s;
260 s = tab[b >> 3 & 0x7];
261 l ^= s << 3;
262 h = s >> 29;
263 s = tab[b >> 6 & 0x7];
264 l ^= s << 6;
265 h ^= s >> 26;
266 s = tab[b >> 9 & 0x7];
267 l ^= s << 9;
268 h ^= s >> 23;
269 s = tab[b >> 12 & 0x7];
270 l ^= s << 12;
271 h ^= s >> 20;
272 s = tab[b >> 15 & 0x7];
273 l ^= s << 15;
274 h ^= s >> 17;
275 s = tab[b >> 18 & 0x7];
276 l ^= s << 18;
277 h ^= s >> 14;
278 s = tab[b >> 21 & 0x7];
279 l ^= s << 21;
280 h ^= s >> 11;
281 s = tab[b >> 24 & 0x7];
282 l ^= s << 24;
283 h ^= s >> 8;
284 s = tab[b >> 27 & 0x7];
285 l ^= s << 27;
286 h ^= s >> 5;
287 s = tab[b >> 30];
288 l ^= s << 30;
289 h ^= s >> 2;
290
291 /* compensate for the top two bits of a */
292
293 if (top2b & 01) {
294 l ^= b << 30;
295 h ^= b >> 2;
296 }
297 if (top2b & 02) {
298 l ^= b << 31;
299 h ^= b >> 1;
300 }
301
302 *r1 = h;
303 *r0 = l;
304 }
305 #endif
306 #if defined(SIXTY_FOUR_BIT) || defined(SIXTY_FOUR_BIT_LONG)
bn_GF2m_mul_1x1(BN_ULONG * r1,BN_ULONG * r0,const BN_ULONG a,const BN_ULONG b)307 static void bn_GF2m_mul_1x1(BN_ULONG *r1, BN_ULONG *r0, const BN_ULONG a,
308 const BN_ULONG b)
309 {
310 register BN_ULONG h, l, s;
311 BN_ULONG tab[16], top3b = a >> 61;
312 register BN_ULONG a1, a2, a4, a8;
313
314 a1 = a & (0x1FFFFFFFFFFFFFFFULL);
315 a2 = a1 << 1;
316 a4 = a2 << 1;
317 a8 = a4 << 1;
318
319 tab[0] = 0;
320 tab[1] = a1;
321 tab[2] = a2;
322 tab[3] = a1 ^ a2;
323 tab[4] = a4;
324 tab[5] = a1 ^ a4;
325 tab[6] = a2 ^ a4;
326 tab[7] = a1 ^ a2 ^ a4;
327 tab[8] = a8;
328 tab[9] = a1 ^ a8;
329 tab[10] = a2 ^ a8;
330 tab[11] = a1 ^ a2 ^ a8;
331 tab[12] = a4 ^ a8;
332 tab[13] = a1 ^ a4 ^ a8;
333 tab[14] = a2 ^ a4 ^ a8;
334 tab[15] = a1 ^ a2 ^ a4 ^ a8;
335
336 s = tab[b & 0xF];
337 l = s;
338 s = tab[b >> 4 & 0xF];
339 l ^= s << 4;
340 h = s >> 60;
341 s = tab[b >> 8 & 0xF];
342 l ^= s << 8;
343 h ^= s >> 56;
344 s = tab[b >> 12 & 0xF];
345 l ^= s << 12;
346 h ^= s >> 52;
347 s = tab[b >> 16 & 0xF];
348 l ^= s << 16;
349 h ^= s >> 48;
350 s = tab[b >> 20 & 0xF];
351 l ^= s << 20;
352 h ^= s >> 44;
353 s = tab[b >> 24 & 0xF];
354 l ^= s << 24;
355 h ^= s >> 40;
356 s = tab[b >> 28 & 0xF];
357 l ^= s << 28;
358 h ^= s >> 36;
359 s = tab[b >> 32 & 0xF];
360 l ^= s << 32;
361 h ^= s >> 32;
362 s = tab[b >> 36 & 0xF];
363 l ^= s << 36;
364 h ^= s >> 28;
365 s = tab[b >> 40 & 0xF];
366 l ^= s << 40;
367 h ^= s >> 24;
368 s = tab[b >> 44 & 0xF];
369 l ^= s << 44;
370 h ^= s >> 20;
371 s = tab[b >> 48 & 0xF];
372 l ^= s << 48;
373 h ^= s >> 16;
374 s = tab[b >> 52 & 0xF];
375 l ^= s << 52;
376 h ^= s >> 12;
377 s = tab[b >> 56 & 0xF];
378 l ^= s << 56;
379 h ^= s >> 8;
380 s = tab[b >> 60];
381 l ^= s << 60;
382 h ^= s >> 4;
383
384 /* compensate for the top three bits of a */
385
386 if (top3b & 01) {
387 l ^= b << 61;
388 h ^= b >> 3;
389 }
390 if (top3b & 02) {
391 l ^= b << 62;
392 h ^= b >> 2;
393 }
394 if (top3b & 04) {
395 l ^= b << 63;
396 h ^= b >> 1;
397 }
398
399 *r1 = h;
400 *r0 = l;
401 }
402 #endif
403
404 /*
405 * Product of two polynomials a, b each with degree < 2 * BN_BITS2 - 1,
406 * result is a polynomial r with degree < 4 * BN_BITS2 - 1 The caller MUST
407 * ensure that the variables have the right amount of space allocated.
408 */
bn_GF2m_mul_2x2(BN_ULONG * r,const BN_ULONG a1,const BN_ULONG a0,const BN_ULONG b1,const BN_ULONG b0)409 static void bn_GF2m_mul_2x2(BN_ULONG *r, const BN_ULONG a1, const BN_ULONG a0,
410 const BN_ULONG b1, const BN_ULONG b0)
411 {
412 BN_ULONG m1, m0;
413 /* r[3] = h1, r[2] = h0; r[1] = l1; r[0] = l0 */
414 bn_GF2m_mul_1x1(r + 3, r + 2, a1, b1);
415 bn_GF2m_mul_1x1(r + 1, r, a0, b0);
416 bn_GF2m_mul_1x1(&m1, &m0, a0 ^ a1, b0 ^ b1);
417 /* Correction on m1 ^= l1 ^ h1; m0 ^= l0 ^ h0; */
418 r[2] ^= m1 ^ r[1] ^ r[3]; /* h0 ^= m1 ^ l1 ^ h1; */
419 r[1] = r[3] ^ r[2] ^ r[0] ^ m1 ^ m0; /* l1 ^= l0 ^ h0 ^ m0; */
420 }
421
422 /*
423 * Add polynomials a and b and store result in r; r could be a or b, a and b
424 * could be equal; r is the bitwise XOR of a and b.
425 */
BN_GF2m_add(BIGNUM * r,const BIGNUM * a,const BIGNUM * b)426 int BN_GF2m_add(BIGNUM *r, const BIGNUM *a, const BIGNUM *b)
427 {
428 int i;
429 const BIGNUM *at, *bt;
430
431 bn_check_top(a);
432 bn_check_top(b);
433
434 if (a->top < b->top) {
435 at = b;
436 bt = a;
437 } else {
438 at = a;
439 bt = b;
440 }
441
442 if (bn_wexpand(r, at->top) == NULL)
443 return 0;
444
445 for (i = 0; i < bt->top; i++) {
446 r->d[i] = at->d[i] ^ bt->d[i];
447 }
448 for (; i < at->top; i++) {
449 r->d[i] = at->d[i];
450 }
451
452 r->top = at->top;
453 bn_correct_top(r);
454
455 return 1;
456 }
457
458 /*-
459 * Some functions allow for representation of the irreducible polynomials
460 * as an int[], say p. The irreducible f(t) is then of the form:
461 * t^p[0] + t^p[1] + ... + t^p[k]
462 * where m = p[0] > p[1] > ... > p[k] = 0.
463 */
464
465 /* Performs modular reduction of a and store result in r. r could be a. */
BN_GF2m_mod_arr(BIGNUM * r,const BIGNUM * a,const unsigned int p[])466 int BN_GF2m_mod_arr(BIGNUM *r, const BIGNUM *a, const unsigned int p[])
467 {
468 int j, k;
469 int n, dN, d0, d1;
470 BN_ULONG zz, *z;
471
472 bn_check_top(a);
473
474 if (!p[0]) {
475 /* reduction mod 1 => return 0 */
476 BN_zero(r);
477 return 1;
478 }
479
480 /*
481 * Since the algorithm does reduction in the r value, if a != r, copy the
482 * contents of a into r so we can do reduction in r.
483 */
484 if (a != r) {
485 if (!bn_wexpand(r, a->top))
486 return 0;
487 for (j = 0; j < a->top; j++) {
488 r->d[j] = a->d[j];
489 }
490 r->top = a->top;
491 }
492 z = r->d;
493
494 /* start reduction */
495 dN = p[0] / BN_BITS2;
496 for (j = r->top - 1; j > dN;) {
497 zz = z[j];
498 if (z[j] == 0) {
499 j--;
500 continue;
501 }
502 z[j] = 0;
503
504 for (k = 1; p[k] != 0; k++) {
505 /* reducing component t^p[k] */
506 n = p[0] - p[k];
507 d0 = n % BN_BITS2;
508 d1 = BN_BITS2 - d0;
509 n /= BN_BITS2;
510 z[j - n] ^= (zz >> d0);
511 if (d0)
512 z[j - n - 1] ^= (zz << d1);
513 }
514
515 /* reducing component t^0 */
516 n = dN;
517 d0 = p[0] % BN_BITS2;
518 d1 = BN_BITS2 - d0;
519 z[j - n] ^= (zz >> d0);
520 if (d0)
521 z[j - n - 1] ^= (zz << d1);
522 }
523
524 /* final round of reduction */
525 while (j == dN) {
526
527 d0 = p[0] % BN_BITS2;
528 zz = z[dN] >> d0;
529 if (zz == 0)
530 break;
531 d1 = BN_BITS2 - d0;
532
533 /* clear up the top d1 bits */
534 if (d0)
535 z[dN] = (z[dN] << d1) >> d1;
536 else
537 z[dN] = 0;
538 z[0] ^= zz; /* reduction t^0 component */
539
540 for (k = 1; p[k] != 0; k++) {
541 BN_ULONG tmp_ulong;
542
543 /* reducing component t^p[k] */
544 n = p[k] / BN_BITS2;
545 d0 = p[k] % BN_BITS2;
546 d1 = BN_BITS2 - d0;
547 z[n] ^= (zz << d0);
548 tmp_ulong = zz >> d1;
549 if (d0 && tmp_ulong)
550 z[n + 1] ^= tmp_ulong;
551 }
552
553 }
554
555 bn_correct_top(r);
556 return 1;
557 }
558
559 /*
560 * Performs modular reduction of a by p and store result in r. r could be a.
561 * This function calls down to the BN_GF2m_mod_arr implementation; this wrapper
562 * function is only provided for convenience; for best performance, use the
563 * BN_GF2m_mod_arr function.
564 */
BN_GF2m_mod(BIGNUM * r,const BIGNUM * a,const BIGNUM * p)565 int BN_GF2m_mod(BIGNUM *r, const BIGNUM *a, const BIGNUM *p)
566 {
567 int ret = 0;
568 const int max = BN_num_bits(p);
569 unsigned int *arr = NULL;
570 bn_check_top(a);
571 bn_check_top(p);
572 if ((arr =
573 (unsigned int *)OPENSSL_malloc(sizeof(unsigned int) * max)) == NULL)
574 goto err;
575 ret = BN_GF2m_poly2arr(p, arr, max);
576 if (!ret || ret > max) {
577 BNerr(BN_F_BN_GF2M_MOD, BN_R_INVALID_LENGTH);
578 goto err;
579 }
580 ret = BN_GF2m_mod_arr(r, a, arr);
581 bn_check_top(r);
582 err:
583 if (arr)
584 OPENSSL_free(arr);
585 return ret;
586 }
587
588 /*
589 * Compute the product of two polynomials a and b, reduce modulo p, and store
590 * the result in r. r could be a or b; a could be b.
591 */
BN_GF2m_mod_mul_arr(BIGNUM * r,const BIGNUM * a,const BIGNUM * b,const unsigned int p[],BN_CTX * ctx)592 int BN_GF2m_mod_mul_arr(BIGNUM *r, const BIGNUM *a, const BIGNUM *b,
593 const unsigned int p[], BN_CTX *ctx)
594 {
595 int zlen, i, j, k, ret = 0;
596 BIGNUM *s;
597 BN_ULONG x1, x0, y1, y0, zz[4];
598
599 bn_check_top(a);
600 bn_check_top(b);
601
602 if (a == b) {
603 return BN_GF2m_mod_sqr_arr(r, a, p, ctx);
604 }
605
606 BN_CTX_start(ctx);
607 if ((s = BN_CTX_get(ctx)) == NULL)
608 goto err;
609
610 zlen = a->top + b->top + 4;
611 if (!bn_wexpand(s, zlen))
612 goto err;
613 s->top = zlen;
614
615 for (i = 0; i < zlen; i++)
616 s->d[i] = 0;
617
618 for (j = 0; j < b->top; j += 2) {
619 y0 = b->d[j];
620 y1 = ((j + 1) == b->top) ? 0 : b->d[j + 1];
621 for (i = 0; i < a->top; i += 2) {
622 x0 = a->d[i];
623 x1 = ((i + 1) == a->top) ? 0 : a->d[i + 1];
624 bn_GF2m_mul_2x2(zz, x1, x0, y1, y0);
625 for (k = 0; k < 4; k++)
626 s->d[i + j + k] ^= zz[k];
627 }
628 }
629
630 bn_correct_top(s);
631 if (BN_GF2m_mod_arr(r, s, p))
632 ret = 1;
633 bn_check_top(r);
634
635 err:
636 BN_CTX_end(ctx);
637 return ret;
638 }
639
640 /*
641 * Compute the product of two polynomials a and b, reduce modulo p, and store
642 * the result in r. r could be a or b; a could equal b. This function calls
643 * down to the BN_GF2m_mod_mul_arr implementation; this wrapper function is
644 * only provided for convenience; for best performance, use the
645 * BN_GF2m_mod_mul_arr function.
646 */
BN_GF2m_mod_mul(BIGNUM * r,const BIGNUM * a,const BIGNUM * b,const BIGNUM * p,BN_CTX * ctx)647 int BN_GF2m_mod_mul(BIGNUM *r, const BIGNUM *a, const BIGNUM *b,
648 const BIGNUM *p, BN_CTX *ctx)
649 {
650 int ret = 0;
651 const int max = BN_num_bits(p);
652 unsigned int *arr = NULL;
653 bn_check_top(a);
654 bn_check_top(b);
655 bn_check_top(p);
656 if ((arr =
657 (unsigned int *)OPENSSL_malloc(sizeof(unsigned int) * max)) == NULL)
658 goto err;
659 ret = BN_GF2m_poly2arr(p, arr, max);
660 if (!ret || ret > max) {
661 BNerr(BN_F_BN_GF2M_MOD_MUL, BN_R_INVALID_LENGTH);
662 goto err;
663 }
664 ret = BN_GF2m_mod_mul_arr(r, a, b, arr, ctx);
665 bn_check_top(r);
666 err:
667 if (arr)
668 OPENSSL_free(arr);
669 return ret;
670 }
671
672 /* Square a, reduce the result mod p, and store it in a. r could be a. */
BN_GF2m_mod_sqr_arr(BIGNUM * r,const BIGNUM * a,const unsigned int p[],BN_CTX * ctx)673 int BN_GF2m_mod_sqr_arr(BIGNUM *r, const BIGNUM *a, const unsigned int p[],
674 BN_CTX *ctx)
675 {
676 int i, ret = 0;
677 BIGNUM *s;
678
679 bn_check_top(a);
680 BN_CTX_start(ctx);
681 if ((s = BN_CTX_get(ctx)) == NULL)
682 return 0;
683 if (!bn_wexpand(s, 2 * a->top))
684 goto err;
685
686 for (i = a->top - 1; i >= 0; i--) {
687 s->d[2 * i + 1] = SQR1(a->d[i]);
688 s->d[2 * i] = SQR0(a->d[i]);
689 }
690
691 s->top = 2 * a->top;
692 bn_correct_top(s);
693 if (!BN_GF2m_mod_arr(r, s, p))
694 goto err;
695 bn_check_top(r);
696 ret = 1;
697 err:
698 BN_CTX_end(ctx);
699 return ret;
700 }
701
702 /*
703 * Square a, reduce the result mod p, and store it in a. r could be a. This
704 * function calls down to the BN_GF2m_mod_sqr_arr implementation; this
705 * wrapper function is only provided for convenience; for best performance,
706 * use the BN_GF2m_mod_sqr_arr function.
707 */
BN_GF2m_mod_sqr(BIGNUM * r,const BIGNUM * a,const BIGNUM * p,BN_CTX * ctx)708 int BN_GF2m_mod_sqr(BIGNUM *r, const BIGNUM *a, const BIGNUM *p, BN_CTX *ctx)
709 {
710 int ret = 0;
711 const int max = BN_num_bits(p);
712 unsigned int *arr = NULL;
713
714 bn_check_top(a);
715 bn_check_top(p);
716 if ((arr =
717 (unsigned int *)OPENSSL_malloc(sizeof(unsigned int) * max)) == NULL)
718 goto err;
719 ret = BN_GF2m_poly2arr(p, arr, max);
720 if (!ret || ret > max) {
721 BNerr(BN_F_BN_GF2M_MOD_SQR, BN_R_INVALID_LENGTH);
722 goto err;
723 }
724 ret = BN_GF2m_mod_sqr_arr(r, a, arr, ctx);
725 bn_check_top(r);
726 err:
727 if (arr)
728 OPENSSL_free(arr);
729 return ret;
730 }
731
732 /*
733 * Invert a, reduce modulo p, and store the result in r. r could be a. Uses
734 * Modified Almost Inverse Algorithm (Algorithm 10) from Hankerson, D.,
735 * Hernandez, J.L., and Menezes, A. "Software Implementation of Elliptic
736 * Curve Cryptography Over Binary Fields".
737 */
BN_GF2m_mod_inv(BIGNUM * r,const BIGNUM * a,const BIGNUM * p,BN_CTX * ctx)738 int BN_GF2m_mod_inv(BIGNUM *r, const BIGNUM *a, const BIGNUM *p, BN_CTX *ctx)
739 {
740 BIGNUM *b, *c, *u, *v, *tmp;
741 int ret = 0;
742
743 bn_check_top(a);
744 bn_check_top(p);
745
746 BN_CTX_start(ctx);
747
748 b = BN_CTX_get(ctx);
749 c = BN_CTX_get(ctx);
750 u = BN_CTX_get(ctx);
751 v = BN_CTX_get(ctx);
752 if (v == NULL)
753 goto err;
754
755 if (!BN_one(b))
756 goto err;
757 if (!BN_GF2m_mod(u, a, p))
758 goto err;
759 if (!BN_copy(v, p))
760 goto err;
761
762 if (BN_is_zero(u))
763 goto err;
764
765 while (1) {
766 while (!BN_is_odd(u)) {
767 if (BN_is_zero(u))
768 goto err;
769 if (!BN_rshift1(u, u))
770 goto err;
771 if (BN_is_odd(b)) {
772 if (!BN_GF2m_add(b, b, p))
773 goto err;
774 }
775 if (!BN_rshift1(b, b))
776 goto err;
777 }
778
779 if (BN_abs_is_word(u, 1))
780 break;
781
782 if (BN_num_bits(u) < BN_num_bits(v)) {
783 tmp = u;
784 u = v;
785 v = tmp;
786 tmp = b;
787 b = c;
788 c = tmp;
789 }
790
791 if (!BN_GF2m_add(u, u, v))
792 goto err;
793 if (!BN_GF2m_add(b, b, c))
794 goto err;
795 }
796
797 if (!BN_copy(r, b))
798 goto err;
799 bn_check_top(r);
800 ret = 1;
801
802 err:
803 BN_CTX_end(ctx);
804 return ret;
805 }
806
807 /*
808 * Invert xx, reduce modulo p, and store the result in r. r could be xx.
809 * This function calls down to the BN_GF2m_mod_inv implementation; this
810 * wrapper function is only provided for convenience; for best performance,
811 * use the BN_GF2m_mod_inv function.
812 */
BN_GF2m_mod_inv_arr(BIGNUM * r,const BIGNUM * xx,const unsigned int p[],BN_CTX * ctx)813 int BN_GF2m_mod_inv_arr(BIGNUM *r, const BIGNUM *xx, const unsigned int p[],
814 BN_CTX *ctx)
815 {
816 BIGNUM *field;
817 int ret = 0;
818
819 bn_check_top(xx);
820 BN_CTX_start(ctx);
821 if ((field = BN_CTX_get(ctx)) == NULL)
822 goto err;
823 if (!BN_GF2m_arr2poly(p, field))
824 goto err;
825
826 ret = BN_GF2m_mod_inv(r, xx, field, ctx);
827 bn_check_top(r);
828
829 err:
830 BN_CTX_end(ctx);
831 return ret;
832 }
833
834 #ifndef OPENSSL_SUN_GF2M_DIV
835 /*
836 * Divide y by x, reduce modulo p, and store the result in r. r could be x
837 * or y, x could equal y.
838 */
BN_GF2m_mod_div(BIGNUM * r,const BIGNUM * y,const BIGNUM * x,const BIGNUM * p,BN_CTX * ctx)839 int BN_GF2m_mod_div(BIGNUM *r, const BIGNUM *y, const BIGNUM *x,
840 const BIGNUM *p, BN_CTX *ctx)
841 {
842 BIGNUM *xinv = NULL;
843 int ret = 0;
844
845 bn_check_top(y);
846 bn_check_top(x);
847 bn_check_top(p);
848
849 BN_CTX_start(ctx);
850 xinv = BN_CTX_get(ctx);
851 if (xinv == NULL)
852 goto err;
853
854 if (!BN_GF2m_mod_inv(xinv, x, p, ctx))
855 goto err;
856 if (!BN_GF2m_mod_mul(r, y, xinv, p, ctx))
857 goto err;
858 bn_check_top(r);
859 ret = 1;
860
861 err:
862 BN_CTX_end(ctx);
863 return ret;
864 }
865 #else
866 /*
867 * Divide y by x, reduce modulo p, and store the result in r. r could be x
868 * or y, x could equal y. Uses algorithm Modular_Division_GF(2^m) from
869 * Chang-Shantz, S. "From Euclid's GCD to Montgomery Multiplication to the
870 * Great Divide".
871 */
BN_GF2m_mod_div(BIGNUM * r,const BIGNUM * y,const BIGNUM * x,const BIGNUM * p,BN_CTX * ctx)872 int BN_GF2m_mod_div(BIGNUM *r, const BIGNUM *y, const BIGNUM *x,
873 const BIGNUM *p, BN_CTX *ctx)
874 {
875 BIGNUM *a, *b, *u, *v;
876 int ret = 0;
877
878 bn_check_top(y);
879 bn_check_top(x);
880 bn_check_top(p);
881
882 BN_CTX_start(ctx);
883
884 a = BN_CTX_get(ctx);
885 b = BN_CTX_get(ctx);
886 u = BN_CTX_get(ctx);
887 v = BN_CTX_get(ctx);
888 if (v == NULL)
889 goto err;
890
891 /* reduce x and y mod p */
892 if (!BN_GF2m_mod(u, y, p))
893 goto err;
894 if (!BN_GF2m_mod(a, x, p))
895 goto err;
896 if (!BN_copy(b, p))
897 goto err;
898
899 while (!BN_is_odd(a)) {
900 if (!BN_rshift1(a, a))
901 goto err;
902 if (BN_is_odd(u))
903 if (!BN_GF2m_add(u, u, p))
904 goto err;
905 if (!BN_rshift1(u, u))
906 goto err;
907 }
908
909 do {
910 if (BN_GF2m_cmp(b, a) > 0) {
911 if (!BN_GF2m_add(b, b, a))
912 goto err;
913 if (!BN_GF2m_add(v, v, u))
914 goto err;
915 do {
916 if (!BN_rshift1(b, b))
917 goto err;
918 if (BN_is_odd(v))
919 if (!BN_GF2m_add(v, v, p))
920 goto err;
921 if (!BN_rshift1(v, v))
922 goto err;
923 } while (!BN_is_odd(b));
924 } else if (BN_abs_is_word(a, 1))
925 break;
926 else {
927 if (!BN_GF2m_add(a, a, b))
928 goto err;
929 if (!BN_GF2m_add(u, u, v))
930 goto err;
931 do {
932 if (!BN_rshift1(a, a))
933 goto err;
934 if (BN_is_odd(u))
935 if (!BN_GF2m_add(u, u, p))
936 goto err;
937 if (!BN_rshift1(u, u))
938 goto err;
939 } while (!BN_is_odd(a));
940 }
941 } while (1);
942
943 if (!BN_copy(r, u))
944 goto err;
945 bn_check_top(r);
946 ret = 1;
947
948 err:
949 BN_CTX_end(ctx);
950 return ret;
951 }
952 #endif
953
954 /*
955 * Divide yy by xx, reduce modulo p, and store the result in r. r could be xx
956 * * or yy, xx could equal yy. This function calls down to the
957 * BN_GF2m_mod_div implementation; this wrapper function is only provided for
958 * convenience; for best performance, use the BN_GF2m_mod_div function.
959 */
BN_GF2m_mod_div_arr(BIGNUM * r,const BIGNUM * yy,const BIGNUM * xx,const unsigned int p[],BN_CTX * ctx)960 int BN_GF2m_mod_div_arr(BIGNUM *r, const BIGNUM *yy, const BIGNUM *xx,
961 const unsigned int p[], BN_CTX *ctx)
962 {
963 BIGNUM *field;
964 int ret = 0;
965
966 bn_check_top(yy);
967 bn_check_top(xx);
968
969 BN_CTX_start(ctx);
970 if ((field = BN_CTX_get(ctx)) == NULL)
971 goto err;
972 if (!BN_GF2m_arr2poly(p, field))
973 goto err;
974
975 ret = BN_GF2m_mod_div(r, yy, xx, field, ctx);
976 bn_check_top(r);
977
978 err:
979 BN_CTX_end(ctx);
980 return ret;
981 }
982
983 /*
984 * Compute the bth power of a, reduce modulo p, and store the result in r. r
985 * could be a. Uses simple square-and-multiply algorithm A.5.1 from IEEE
986 * P1363.
987 */
BN_GF2m_mod_exp_arr(BIGNUM * r,const BIGNUM * a,const BIGNUM * b,const unsigned int p[],BN_CTX * ctx)988 int BN_GF2m_mod_exp_arr(BIGNUM *r, const BIGNUM *a, const BIGNUM *b,
989 const unsigned int p[], BN_CTX *ctx)
990 {
991 int ret = 0, i, n;
992 BIGNUM *u;
993
994 bn_check_top(a);
995 bn_check_top(b);
996
997 if (BN_is_zero(b))
998 return (BN_one(r));
999
1000 if (BN_abs_is_word(b, 1))
1001 return (BN_copy(r, a) != NULL);
1002
1003 BN_CTX_start(ctx);
1004 if ((u = BN_CTX_get(ctx)) == NULL)
1005 goto err;
1006
1007 if (!BN_GF2m_mod_arr(u, a, p))
1008 goto err;
1009
1010 n = BN_num_bits(b) - 1;
1011 for (i = n - 1; i >= 0; i--) {
1012 if (!BN_GF2m_mod_sqr_arr(u, u, p, ctx))
1013 goto err;
1014 if (BN_is_bit_set(b, i)) {
1015 if (!BN_GF2m_mod_mul_arr(u, u, a, p, ctx))
1016 goto err;
1017 }
1018 }
1019 if (!BN_copy(r, u))
1020 goto err;
1021 bn_check_top(r);
1022 ret = 1;
1023 err:
1024 BN_CTX_end(ctx);
1025 return ret;
1026 }
1027
1028 /*
1029 * Compute the bth power of a, reduce modulo p, and store the result in r. r
1030 * could be a. This function calls down to the BN_GF2m_mod_exp_arr
1031 * implementation; this wrapper function is only provided for convenience;
1032 * for best performance, use the BN_GF2m_mod_exp_arr function.
1033 */
BN_GF2m_mod_exp(BIGNUM * r,const BIGNUM * a,const BIGNUM * b,const BIGNUM * p,BN_CTX * ctx)1034 int BN_GF2m_mod_exp(BIGNUM *r, const BIGNUM *a, const BIGNUM *b,
1035 const BIGNUM *p, BN_CTX *ctx)
1036 {
1037 int ret = 0;
1038 const int max = BN_num_bits(p);
1039 unsigned int *arr = NULL;
1040 bn_check_top(a);
1041 bn_check_top(b);
1042 bn_check_top(p);
1043 if ((arr =
1044 (unsigned int *)OPENSSL_malloc(sizeof(unsigned int) * max)) == NULL)
1045 goto err;
1046 ret = BN_GF2m_poly2arr(p, arr, max);
1047 if (!ret || ret > max) {
1048 BNerr(BN_F_BN_GF2M_MOD_EXP, BN_R_INVALID_LENGTH);
1049 goto err;
1050 }
1051 ret = BN_GF2m_mod_exp_arr(r, a, b, arr, ctx);
1052 bn_check_top(r);
1053 err:
1054 if (arr)
1055 OPENSSL_free(arr);
1056 return ret;
1057 }
1058
1059 /*
1060 * Compute the square root of a, reduce modulo p, and store the result in r.
1061 * r could be a. Uses exponentiation as in algorithm A.4.1 from IEEE P1363.
1062 */
BN_GF2m_mod_sqrt_arr(BIGNUM * r,const BIGNUM * a,const unsigned int p[],BN_CTX * ctx)1063 int BN_GF2m_mod_sqrt_arr(BIGNUM *r, const BIGNUM *a, const unsigned int p[],
1064 BN_CTX *ctx)
1065 {
1066 int ret = 0;
1067 BIGNUM *u;
1068
1069 bn_check_top(a);
1070
1071 if (!p[0]) {
1072 /* reduction mod 1 => return 0 */
1073 BN_zero(r);
1074 return 1;
1075 }
1076
1077 BN_CTX_start(ctx);
1078 if ((u = BN_CTX_get(ctx)) == NULL)
1079 goto err;
1080
1081 if (!BN_set_bit(u, p[0] - 1))
1082 goto err;
1083 ret = BN_GF2m_mod_exp_arr(r, a, u, p, ctx);
1084 bn_check_top(r);
1085
1086 err:
1087 BN_CTX_end(ctx);
1088 return ret;
1089 }
1090
1091 /*
1092 * Compute the square root of a, reduce modulo p, and store the result in r.
1093 * r could be a. This function calls down to the BN_GF2m_mod_sqrt_arr
1094 * implementation; this wrapper function is only provided for convenience;
1095 * for best performance, use the BN_GF2m_mod_sqrt_arr function.
1096 */
BN_GF2m_mod_sqrt(BIGNUM * r,const BIGNUM * a,const BIGNUM * p,BN_CTX * ctx)1097 int BN_GF2m_mod_sqrt(BIGNUM *r, const BIGNUM *a, const BIGNUM *p, BN_CTX *ctx)
1098 {
1099 int ret = 0;
1100 const int max = BN_num_bits(p);
1101 unsigned int *arr = NULL;
1102 bn_check_top(a);
1103 bn_check_top(p);
1104 if ((arr =
1105 (unsigned int *)OPENSSL_malloc(sizeof(unsigned int) * max)) == NULL)
1106 goto err;
1107 ret = BN_GF2m_poly2arr(p, arr, max);
1108 if (!ret || ret > max) {
1109 BNerr(BN_F_BN_GF2M_MOD_SQRT, BN_R_INVALID_LENGTH);
1110 goto err;
1111 }
1112 ret = BN_GF2m_mod_sqrt_arr(r, a, arr, ctx);
1113 bn_check_top(r);
1114 err:
1115 if (arr)
1116 OPENSSL_free(arr);
1117 return ret;
1118 }
1119
1120 /*
1121 * Find r such that r^2 + r = a mod p. r could be a. If no r exists returns
1122 * 0. Uses algorithms A.4.7 and A.4.6 from IEEE P1363.
1123 */
BN_GF2m_mod_solve_quad_arr(BIGNUM * r,const BIGNUM * a_,const unsigned int p[],BN_CTX * ctx)1124 int BN_GF2m_mod_solve_quad_arr(BIGNUM *r, const BIGNUM *a_,
1125 const unsigned int p[], BN_CTX *ctx)
1126 {
1127 int ret = 0, count = 0;
1128 unsigned int j;
1129 BIGNUM *a, *z, *rho, *w, *w2, *tmp;
1130
1131 bn_check_top(a_);
1132
1133 if (!p[0]) {
1134 /* reduction mod 1 => return 0 */
1135 BN_zero(r);
1136 return 1;
1137 }
1138
1139 BN_CTX_start(ctx);
1140 a = BN_CTX_get(ctx);
1141 z = BN_CTX_get(ctx);
1142 w = BN_CTX_get(ctx);
1143 if (w == NULL)
1144 goto err;
1145
1146 if (!BN_GF2m_mod_arr(a, a_, p))
1147 goto err;
1148
1149 if (BN_is_zero(a)) {
1150 BN_zero(r);
1151 ret = 1;
1152 goto err;
1153 }
1154
1155 if (p[0] & 0x1) { /* m is odd */
1156 /* compute half-trace of a */
1157 if (!BN_copy(z, a))
1158 goto err;
1159 for (j = 1; j <= (p[0] - 1) / 2; j++) {
1160 if (!BN_GF2m_mod_sqr_arr(z, z, p, ctx))
1161 goto err;
1162 if (!BN_GF2m_mod_sqr_arr(z, z, p, ctx))
1163 goto err;
1164 if (!BN_GF2m_add(z, z, a))
1165 goto err;
1166 }
1167
1168 } else { /* m is even */
1169
1170 rho = BN_CTX_get(ctx);
1171 w2 = BN_CTX_get(ctx);
1172 tmp = BN_CTX_get(ctx);
1173 if (tmp == NULL)
1174 goto err;
1175 do {
1176 if (!BN_rand(rho, p[0], 0, 0))
1177 goto err;
1178 if (!BN_GF2m_mod_arr(rho, rho, p))
1179 goto err;
1180 BN_zero(z);
1181 if (!BN_copy(w, rho))
1182 goto err;
1183 for (j = 1; j <= p[0] - 1; j++) {
1184 if (!BN_GF2m_mod_sqr_arr(z, z, p, ctx))
1185 goto err;
1186 if (!BN_GF2m_mod_sqr_arr(w2, w, p, ctx))
1187 goto err;
1188 if (!BN_GF2m_mod_mul_arr(tmp, w2, a, p, ctx))
1189 goto err;
1190 if (!BN_GF2m_add(z, z, tmp))
1191 goto err;
1192 if (!BN_GF2m_add(w, w2, rho))
1193 goto err;
1194 }
1195 count++;
1196 } while (BN_is_zero(w) && (count < MAX_ITERATIONS));
1197 if (BN_is_zero(w)) {
1198 BNerr(BN_F_BN_GF2M_MOD_SOLVE_QUAD_ARR, BN_R_TOO_MANY_ITERATIONS);
1199 goto err;
1200 }
1201 }
1202
1203 if (!BN_GF2m_mod_sqr_arr(w, z, p, ctx))
1204 goto err;
1205 if (!BN_GF2m_add(w, z, w))
1206 goto err;
1207 if (BN_GF2m_cmp(w, a)) {
1208 BNerr(BN_F_BN_GF2M_MOD_SOLVE_QUAD_ARR, BN_R_NO_SOLUTION);
1209 goto err;
1210 }
1211
1212 if (!BN_copy(r, z))
1213 goto err;
1214 bn_check_top(r);
1215
1216 ret = 1;
1217
1218 err:
1219 BN_CTX_end(ctx);
1220 return ret;
1221 }
1222
1223 /*
1224 * Find r such that r^2 + r = a mod p. r could be a. If no r exists returns
1225 * 0. This function calls down to the BN_GF2m_mod_solve_quad_arr
1226 * implementation; this wrapper function is only provided for convenience;
1227 * for best performance, use the BN_GF2m_mod_solve_quad_arr function.
1228 */
BN_GF2m_mod_solve_quad(BIGNUM * r,const BIGNUM * a,const BIGNUM * p,BN_CTX * ctx)1229 int BN_GF2m_mod_solve_quad(BIGNUM *r, const BIGNUM *a, const BIGNUM *p,
1230 BN_CTX *ctx)
1231 {
1232 int ret = 0;
1233 const int max = BN_num_bits(p);
1234 unsigned int *arr = NULL;
1235 bn_check_top(a);
1236 bn_check_top(p);
1237 if ((arr = (unsigned int *)OPENSSL_malloc(sizeof(unsigned int) *
1238 max)) == NULL)
1239 goto err;
1240 ret = BN_GF2m_poly2arr(p, arr, max);
1241 if (!ret || ret > max) {
1242 BNerr(BN_F_BN_GF2M_MOD_SOLVE_QUAD, BN_R_INVALID_LENGTH);
1243 goto err;
1244 }
1245 ret = BN_GF2m_mod_solve_quad_arr(r, a, arr, ctx);
1246 bn_check_top(r);
1247 err:
1248 if (arr)
1249 OPENSSL_free(arr);
1250 return ret;
1251 }
1252
1253 /*
1254 * Convert the bit-string representation of a polynomial ( \sum_{i=0}^n a_i *
1255 * x^i , where a_0 is *not* zero) into an array of integers corresponding to
1256 * the bits with non-zero coefficient. Up to max elements of the array will
1257 * be filled. Return value is total number of coefficients that would be
1258 * extracted if array was large enough.
1259 */
BN_GF2m_poly2arr(const BIGNUM * a,unsigned int p[],int max)1260 int BN_GF2m_poly2arr(const BIGNUM *a, unsigned int p[], int max)
1261 {
1262 int i, j, k = 0;
1263 BN_ULONG mask;
1264
1265 if (BN_is_zero(a) || !BN_is_bit_set(a, 0))
1266 /*
1267 * a_0 == 0 => return error (the unsigned int array must be
1268 * terminated by 0)
1269 */
1270 return 0;
1271
1272 for (i = a->top - 1; i >= 0; i--) {
1273 if (!a->d[i])
1274 /* skip word if a->d[i] == 0 */
1275 continue;
1276 mask = BN_TBIT;
1277 for (j = BN_BITS2 - 1; j >= 0; j--) {
1278 if (a->d[i] & mask) {
1279 if (k < max)
1280 p[k] = BN_BITS2 * i + j;
1281 k++;
1282 }
1283 mask >>= 1;
1284 }
1285 }
1286
1287 return k;
1288 }
1289
1290 /*
1291 * Convert the coefficient array representation of a polynomial to a
1292 * bit-string. The array must be terminated by 0.
1293 */
BN_GF2m_arr2poly(const unsigned int p[],BIGNUM * a)1294 int BN_GF2m_arr2poly(const unsigned int p[], BIGNUM *a)
1295 {
1296 int i;
1297
1298 bn_check_top(a);
1299 BN_zero(a);
1300 for (i = 0; p[i] != 0; i++) {
1301 if (BN_set_bit(a, p[i]) == 0)
1302 return 0;
1303 }
1304 BN_set_bit(a, 0);
1305 bn_check_top(a);
1306
1307 return 1;
1308 }
1309
1310 /*
1311 * Constant-time conditional swap of a and b.
1312 * a and b are swapped if condition is not 0. The code assumes that at most one bit of condition is set.
1313 * nwords is the number of words to swap. The code assumes that at least nwords are allocated in both a and b,
1314 * and that no more than nwords are used by either a or b.
1315 * a and b cannot be the same number
1316 */
BN_consttime_swap(BN_ULONG condition,BIGNUM * a,BIGNUM * b,int nwords)1317 void BN_consttime_swap(BN_ULONG condition, BIGNUM *a, BIGNUM *b, int nwords)
1318 {
1319 BN_ULONG t;
1320 int i;
1321
1322 bn_wcheck_size(a, nwords);
1323 bn_wcheck_size(b, nwords);
1324
1325 assert(a != b);
1326 assert((condition & (condition - 1)) == 0);
1327 assert(sizeof(BN_ULONG) >= sizeof(int));
1328
1329 condition = ((condition - 1) >> (BN_BITS2 - 1)) - 1;
1330
1331 t = (a->top ^ b->top) & condition;
1332 a->top ^= t;
1333 b->top ^= t;
1334
1335 #define BN_CONSTTIME_SWAP(ind) \
1336 do { \
1337 t = (a->d[ind] ^ b->d[ind]) & condition; \
1338 a->d[ind] ^= t; \
1339 b->d[ind] ^= t; \
1340 } while (0)
1341
1342 switch (nwords) {
1343 default:
1344 for (i = 10; i < nwords; i++)
1345 BN_CONSTTIME_SWAP(i);
1346 /* Fallthrough */
1347 case 10:
1348 BN_CONSTTIME_SWAP(9); /* Fallthrough */
1349 case 9:
1350 BN_CONSTTIME_SWAP(8); /* Fallthrough */
1351 case 8:
1352 BN_CONSTTIME_SWAP(7); /* Fallthrough */
1353 case 7:
1354 BN_CONSTTIME_SWAP(6); /* Fallthrough */
1355 case 6:
1356 BN_CONSTTIME_SWAP(5); /* Fallthrough */
1357 case 5:
1358 BN_CONSTTIME_SWAP(4); /* Fallthrough */
1359 case 4:
1360 BN_CONSTTIME_SWAP(3); /* Fallthrough */
1361 case 3:
1362 BN_CONSTTIME_SWAP(2); /* Fallthrough */
1363 case 2:
1364 BN_CONSTTIME_SWAP(1); /* Fallthrough */
1365 case 1:
1366 BN_CONSTTIME_SWAP(0);
1367 }
1368 #undef BN_CONSTTIME_SWAP
1369 }
1370