2 * Copyright 1995-2020 The OpenSSL Project Authors. All Rights Reserved.
4 * Licensed under the Apache License 2.0 (the "License"). You may not use
5 * this file except in compliance with the License. You can obtain a copy
6 * in the file LICENSE in the source distribution or at
7 * https://www.openssl.org/source/license.html
14 # include <strings.h> /* strcasecmp */
18 #include <openssl/bn.h>
19 #include <openssl/crypto.h>
20 #include <openssl/err.h>
21 #include <openssl/rand.h>
22 #include "internal/nelem.h"
23 #include "internal/numbers.h"
26 #ifdef OPENSSL_SYS_WINDOWS
27 # define strcasecmp _stricmp
31 * Things in boring, not in openssl.
33 #define HAVE_BN_PADDED 0
34 #define HAVE_BN_SQRT 0
36 typedef struct filetest_st {
38 int (*func)(STANZA *s);
41 typedef struct mpitest_st {
47 static const int NUM0 = 100; /* number of tests */
48 static const int NUM1 = 50; /* additional tests for some functions */
52 * Polynomial coefficients used in GFM tests.
54 #ifndef OPENSSL_NO_EC2M
55 static int p0[] = { 163, 7, 6, 3, 0, -1 };
56 static int p1[] = { 193, 15, 0, -1 };
60 * Look for |key| in the stanza and return it or NULL if not found.
62 static const char *findattr(STANZA *s, const char *key)
67 for ( ; --i >= 0; pp++)
68 if (strcasecmp(pp->key, key) == 0)
74 * Parse BIGNUM from sparse hex-strings, return |BN_hex2bn| result.
76 static int parse_bigBN(BIGNUM **out, const char *bn_strings[])
78 char *bigstring = glue_strings(bn_strings, NULL);
79 int ret = BN_hex2bn(out, bigstring);
81 OPENSSL_free(bigstring);
86 * Parse BIGNUM, return number of bytes parsed.
88 static int parseBN(BIGNUM **out, const char *in)
91 return BN_hex2bn(out, in);
94 static int parsedecBN(BIGNUM **out, const char *in)
97 return BN_dec2bn(out, in);
100 static BIGNUM *getBN(STANZA *s, const char *attribute)
105 if ((hex = findattr(s, attribute)) == NULL) {
106 TEST_error("%s:%d: Can't find %s", s->test_file, s->start, attribute);
110 if (parseBN(&ret, hex) != (int)strlen(hex)) {
111 TEST_error("Could not decode '%s'", hex);
117 static int getint(STANZA *s, int *out, const char *attribute)
123 if (!TEST_ptr(ret = getBN(s, attribute))
124 || !TEST_ulong_le(word = BN_get_word(ret), INT_MAX))
134 static int equalBN(const char *op, const BIGNUM *expected, const BIGNUM *actual)
136 if (BN_cmp(expected, actual) == 0)
139 TEST_error("unexpected %s value", op);
140 TEST_BN_eq(expected, actual);
145 * Return a "random" flag for if a BN should be negated.
147 static int rand_neg(void)
149 static unsigned int neg = 0;
150 static int sign[8] = { 0, 0, 0, 1, 1, 0, 1, 1 };
152 return sign[(neg++) % 8];
155 static int test_swap(void)
157 BIGNUM *a = NULL, *b = NULL, *c = NULL, *d = NULL;
158 int top, cond, st = 0;
160 if (!TEST_ptr(a = BN_new())
161 || !TEST_ptr(b = BN_new())
162 || !TEST_ptr(c = BN_new())
163 || !TEST_ptr(d = BN_new()))
166 if (!(TEST_true(BN_bntest_rand(a, 1024, 1, 0))
167 && TEST_true(BN_bntest_rand(b, 1024, 1, 0))
168 && TEST_ptr(BN_copy(c, a))
169 && TEST_ptr(BN_copy(d, b))))
171 top = BN_num_bits(a) / BN_BITS2;
175 if (!equalBN("swap", a, d)
176 || !equalBN("swap", b, c))
179 /* conditional swap: true */
181 BN_consttime_swap(cond, a, b, top);
182 if (!equalBN("cswap true", a, c)
183 || !equalBN("cswap true", b, d))
186 /* conditional swap: false */
188 BN_consttime_swap(cond, a, b, top);
189 if (!equalBN("cswap false", a, c)
190 || !equalBN("cswap false", b, d))
193 /* same tests but checking flag swap */
194 BN_set_flags(a, BN_FLG_CONSTTIME);
197 if (!equalBN("swap, flags", a, d)
198 || !equalBN("swap, flags", b, c)
199 || !TEST_true(BN_get_flags(b, BN_FLG_CONSTTIME))
200 || !TEST_false(BN_get_flags(a, BN_FLG_CONSTTIME)))
204 BN_consttime_swap(cond, a, b, top);
205 if (!equalBN("cswap true, flags", a, c)
206 || !equalBN("cswap true, flags", b, d)
207 || !TEST_true(BN_get_flags(a, BN_FLG_CONSTTIME))
208 || !TEST_false(BN_get_flags(b, BN_FLG_CONSTTIME)))
212 BN_consttime_swap(cond, a, b, top);
213 if (!equalBN("cswap false, flags", a, c)
214 || !equalBN("cswap false, flags", b, d)
215 || !TEST_true(BN_get_flags(a, BN_FLG_CONSTTIME))
216 || !TEST_false(BN_get_flags(b, BN_FLG_CONSTTIME)))
228 static int test_sub(void)
230 BIGNUM *a = NULL, *b = NULL, *c = NULL;
233 if (!TEST_ptr(a = BN_new())
234 || !TEST_ptr(b = BN_new())
235 || !TEST_ptr(c = BN_new()))
238 for (i = 0; i < NUM0 + NUM1; i++) {
240 if (!(TEST_true(BN_bntest_rand(a, 512, 0, 0)))
241 && TEST_ptr(BN_copy(b, a))
242 && TEST_int_ne(BN_set_bit(a, i), 0)
243 && TEST_true(BN_add_word(b, i)))
246 if (!TEST_true(BN_bntest_rand(b, 400 + i - NUM1, 0, 0)))
248 BN_set_negative(a, rand_neg());
249 BN_set_negative(b, rand_neg());
251 if (!(TEST_true(BN_sub(c, a, b))
252 && TEST_true(BN_add(c, c, b))
253 && TEST_true(BN_sub(c, c, a))
254 && TEST_BN_eq_zero(c)))
265 static int test_div_recip(void)
267 BIGNUM *a = NULL, *b = NULL, *c = NULL, *d = NULL, *e = NULL;
268 BN_RECP_CTX *recp = NULL;
271 if (!TEST_ptr(a = BN_new())
272 || !TEST_ptr(b = BN_new())
273 || !TEST_ptr(c = BN_new())
274 || !TEST_ptr(d = BN_new())
275 || !TEST_ptr(e = BN_new())
276 || !TEST_ptr(recp = BN_RECP_CTX_new()))
279 for (i = 0; i < NUM0 + NUM1; i++) {
281 if (!(TEST_true(BN_bntest_rand(a, 400, 0, 0))
282 && TEST_ptr(BN_copy(b, a))
283 && TEST_true(BN_lshift(a, a, i))
284 && TEST_true(BN_add_word(a, i))))
287 if (!(TEST_true(BN_bntest_rand(b, 50 + 3 * (i - NUM1), 0, 0))))
290 BN_set_negative(a, rand_neg());
291 BN_set_negative(b, rand_neg());
292 if (!(TEST_true(BN_RECP_CTX_set(recp, b, ctx))
293 && TEST_true(BN_div_recp(d, c, a, recp, ctx))
294 && TEST_true(BN_mul(e, d, b, ctx))
295 && TEST_true(BN_add(d, e, c))
296 && TEST_true(BN_sub(d, d, a))
297 && TEST_BN_eq_zero(d)))
307 BN_RECP_CTX_free(recp);
311 static int test_mod(void)
313 BIGNUM *a = NULL, *b = NULL, *c = NULL, *d = NULL, *e = NULL;
316 if (!TEST_ptr(a = BN_new())
317 || !TEST_ptr(b = BN_new())
318 || !TEST_ptr(c = BN_new())
319 || !TEST_ptr(d = BN_new())
320 || !TEST_ptr(e = BN_new()))
323 if (!(TEST_true(BN_bntest_rand(a, 1024, 0, 0))))
325 for (i = 0; i < NUM0; i++) {
326 if (!(TEST_true(BN_bntest_rand(b, 450 + i * 10, 0, 0))))
328 BN_set_negative(a, rand_neg());
329 BN_set_negative(b, rand_neg());
330 if (!(TEST_true(BN_mod(c, a, b, ctx))
331 && TEST_true(BN_div(d, e, a, b, ctx))
332 && TEST_true(BN_sub(e, e, c))
333 && TEST_BN_eq_zero(e)))
346 static const char *bn1strings[] = {
347 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
348 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
349 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
350 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
351 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
352 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
353 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
354 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF00000000000000FFFFFFFF00",
355 "0000000000000000000000000000000000000000000000000000000000000000",
356 "0000000000000000000000000000000000000000000000000000000000000000",
357 "0000000000000000000000000000000000000000000000000000000000000000",
358 "0000000000000000000000000000000000000000000000000000000000000000",
359 "0000000000000000000000000000000000000000000000000000000000000000",
360 "0000000000000000000000000000000000000000000000000000000000000000",
361 "0000000000000000000000000000000000000000000000000000000000000000",
362 "00000000000000000000000000000000000000000000000000FFFFFFFFFFFFFF",
366 static const char *bn2strings[] = {
367 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
368 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
369 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
370 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
371 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
372 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
373 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
374 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF00000000000000FFFFFFFF0000000000",
375 "0000000000000000000000000000000000000000000000000000000000000000",
376 "0000000000000000000000000000000000000000000000000000000000000000",
377 "0000000000000000000000000000000000000000000000000000000000000000",
378 "0000000000000000000000000000000000000000000000000000000000000000",
379 "0000000000000000000000000000000000000000000000000000000000000000",
380 "0000000000000000000000000000000000000000000000000000000000000000",
381 "0000000000000000000000000000000000000000000000000000000000000000",
382 "000000000000000000000000000000000000000000FFFFFFFFFFFFFF00000000",
387 * Test constant-time modular exponentiation with 1024-bit inputs, which on
388 * x86_64 cause a different code branch to be taken.
390 static int test_modexp_mont5(void)
392 BIGNUM *a = NULL, *p = NULL, *m = NULL, *d = NULL, *e = NULL;
393 BIGNUM *b = NULL, *n = NULL, *c = NULL;
394 BN_MONT_CTX *mont = NULL;
397 if (!TEST_ptr(a = BN_new())
398 || !TEST_ptr(p = BN_new())
399 || !TEST_ptr(m = BN_new())
400 || !TEST_ptr(d = BN_new())
401 || !TEST_ptr(e = BN_new())
402 || !TEST_ptr(b = BN_new())
403 || !TEST_ptr(n = BN_new())
404 || !TEST_ptr(c = BN_new())
405 || !TEST_ptr(mont = BN_MONT_CTX_new()))
408 /* must be odd for montgomery */
409 if (!(TEST_true(BN_bntest_rand(m, 1024, 0, 1))
411 && TEST_true(BN_bntest_rand(a, 1024, 0, 0))))
415 if (!TEST_true(BN_mod_exp_mont_consttime(d, a, p, m, ctx, NULL)))
417 if (!TEST_BN_eq_one(d))
420 /* Regression test for carry bug in mulx4x_mont */
421 if (!(TEST_true(BN_hex2bn(&a,
422 "7878787878787878787878787878787878787878787878787878787878787878"
423 "7878787878787878787878787878787878787878787878787878787878787878"
424 "7878787878787878787878787878787878787878787878787878787878787878"
425 "7878787878787878787878787878787878787878787878787878787878787878"))
426 && TEST_true(BN_hex2bn(&b,
427 "095D72C08C097BA488C5E439C655A192EAFB6380073D8C2664668EDDB4060744"
428 "E16E57FB4EDB9AE10A0CEFCDC28A894F689A128379DB279D48A2E20849D68593"
429 "9B7803BCF46CEBF5C533FB0DD35B080593DE5472E3FE5DB951B8BFF9B4CB8F03"
430 "9CC638A5EE8CDD703719F8000E6A9F63BEED5F2FCD52FF293EA05A251BB4AB81"))
431 && TEST_true(BN_hex2bn(&n,
432 "D78AF684E71DB0C39CFF4E64FB9DB567132CB9C50CC98009FEB820B26F2DED9B"
433 "91B9B5E2B83AE0AE4EB4E0523CA726BFBE969B89FD754F674CE99118C3F2D1C5"
434 "D81FDC7C54E02B60262B241D53C040E99E45826ECA37A804668E690E1AFC1CA4"
435 "2C9A15D84D4954425F0B7642FC0BD9D7B24E2618D2DCC9B729D944BADACFDDAF"))))
438 if (!(TEST_true(BN_MONT_CTX_set(mont, n, ctx))
439 && TEST_true(BN_mod_mul_montgomery(c, a, b, mont, ctx))
440 && TEST_true(BN_mod_mul_montgomery(d, b, a, mont, ctx))
441 && TEST_BN_eq(c, d)))
444 /* Regression test for carry bug in sqr[x]8x_mont */
445 if (!(TEST_true(parse_bigBN(&n, bn1strings))
446 && TEST_true(parse_bigBN(&a, bn2strings))))
449 if (!(TEST_ptr(b = BN_dup(a))
450 && TEST_true(BN_MONT_CTX_set(mont, n, ctx))
451 && TEST_true(BN_mod_mul_montgomery(c, a, a, mont, ctx))
452 && TEST_true(BN_mod_mul_montgomery(d, a, b, mont, ctx))
453 && TEST_BN_eq(c, d)))
456 /* Regression test for carry bug in bn_sqrx8x_internal */
458 static const char *ahex[] = {
459 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
460 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
461 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
462 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
463 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF8FFEADBCFC4DAE7FFF908E92820306B",
464 "9544D954000000006C0000000000000000000000000000000000000000000000",
465 "00000000000000000000FF030202FFFFF8FFEBDBCFC4DAE7FFF908E92820306B",
466 "9544D954000000006C000000FF0302030000000000FFFFFFFFFFFFFFFFFFFFFF",
467 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF01FC00FF02FFFFFFFF",
468 "00FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF00FCFD",
469 "FCFFFFFFFFFF000000000000000000FF0302030000000000FFFFFFFFFFFFFFFF",
470 "FF00FCFDFDFF030202FF00000000FFFFFFFFFFFFFFFFFF00FCFDFCFFFFFFFFFF",
473 static const char *nhex[] = {
474 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
475 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
476 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
477 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
478 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF8F8F8F8000000",
479 "00000010000000006C0000000000000000000000000000000000000000000000",
480 "00000000000000000000000000000000000000FFFFFFFFFFFFF8F8F8F8000000",
481 "00000010000000006C000000000000000000000000FFFFFFFFFFFFFFFFFFFFFF",
482 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
483 "00FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
484 "FFFFFFFFFFFF000000000000000000000000000000000000FFFFFFFFFFFFFFFF",
485 "FFFFFFFFFFFFFFFFFFFF00000000FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF",
489 if (!(TEST_true(parse_bigBN(&a, ahex))
490 && TEST_true(parse_bigBN(&n, nhex))))
494 if (!(TEST_ptr(b = BN_dup(a))
495 && TEST_true(BN_MONT_CTX_set(mont, n, ctx))))
498 if (!TEST_true(BN_mod_mul_montgomery(c, a, a, mont, ctx))
499 || !TEST_true(BN_mod_mul_montgomery(d, a, b, mont, ctx))
500 || !TEST_BN_eq(c, d))
503 /* Regression test for bug in BN_from_montgomery_word */
504 if (!(TEST_true(BN_hex2bn(&a,
505 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
506 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
507 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"))
508 && TEST_true(BN_hex2bn(&n,
509 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
510 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"))
511 && TEST_true(BN_MONT_CTX_set(mont, n, ctx))
512 && TEST_false(BN_mod_mul_montgomery(d, a, a, mont, ctx))))
515 /* Regression test for bug in rsaz_1024_mul_avx2 */
516 if (!(TEST_true(BN_hex2bn(&a,
517 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
518 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
519 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
520 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF2020202020DF"))
521 && TEST_true(BN_hex2bn(&b,
522 "2020202020202020202020202020202020202020202020202020202020202020"
523 "2020202020202020202020202020202020202020202020202020202020202020"
524 "20202020202020FF202020202020202020202020202020202020202020202020"
525 "2020202020202020202020202020202020202020202020202020202020202020"))
526 && TEST_true(BN_hex2bn(&n,
527 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
528 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
529 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
530 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF2020202020FF"))
531 && TEST_true(BN_MONT_CTX_set(mont, n, ctx))
532 && TEST_true(BN_mod_exp_mont_consttime(c, a, b, n, ctx, mont))
533 && TEST_true(BN_mod_exp_mont(d, a, b, n, ctx, mont))
534 && TEST_BN_eq(c, d)))
538 * rsaz_1024_mul_avx2 expects fully-reduced inputs.
539 * BN_mod_exp_mont_consttime should reduce the input first.
541 if (!(TEST_true(BN_hex2bn(&a,
542 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
543 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
544 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
545 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF2020202020DF"))
546 && TEST_true(BN_hex2bn(&b,
547 "1FA53F26F8811C58BE0357897AA5E165693230BC9DF5F01DFA6A2D59229EC69D"
548 "9DE6A89C36E3B6957B22D6FAAD5A3C73AE587B710DBE92E83D3A9A3339A085CB"
549 "B58F508CA4F837924BB52CC1698B7FDC2FD74362456A595A5B58E38E38E38E38"
550 "E38E38E38E38E38E38E38E38E38E38E38E38E38E38E38E38E38E38E38E38E38E"))
551 && TEST_true(BN_hex2bn(&n,
552 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
553 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
554 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF"
555 "FFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFF2020202020DF"))
556 && TEST_true(BN_MONT_CTX_set(mont, n, ctx))
557 && TEST_true(BN_mod_exp_mont_consttime(c, a, b, n, ctx, mont))))
560 if (!TEST_BN_eq(c, d))
564 if (!TEST_true(BN_bntest_rand(p, 1024, 0, 0)))
567 if (!TEST_true(BN_mod_exp_mont_consttime(d, a, p, m, ctx, NULL))
568 || !TEST_BN_eq_zero(d))
572 * Craft an input whose Montgomery representation is 1, i.e., shorter
573 * than the modulus m, in order to test the const time precomputation
574 * scattering/gathering.
576 if (!(TEST_true(BN_one(a))
577 && TEST_true(BN_MONT_CTX_set(mont, m, ctx))))
579 if (!TEST_true(BN_from_montgomery(e, a, mont, ctx))
580 || !TEST_true(BN_mod_exp_mont_consttime(d, e, p, m, ctx, NULL))
581 || !TEST_true(BN_mod_exp_simple(a, e, p, m, ctx))
582 || !TEST_BN_eq(a, d))
585 /* Finally, some regular test vectors. */
586 if (!(TEST_true(BN_bntest_rand(e, 1024, 0, 0))
587 && TEST_true(BN_mod_exp_mont_consttime(d, e, p, m, ctx, NULL))
588 && TEST_true(BN_mod_exp_simple(a, e, p, m, ctx))
589 && TEST_BN_eq(a, d)))
595 BN_MONT_CTX_free(mont);
607 #ifndef OPENSSL_NO_EC2M
608 static int test_gf2m_add(void)
610 BIGNUM *a = NULL, *b = NULL, *c = NULL;
613 if (!TEST_ptr(a = BN_new())
614 || !TEST_ptr(b = BN_new())
615 || !TEST_ptr(c = BN_new()))
618 for (i = 0; i < NUM0; i++) {
619 if (!(TEST_true(BN_rand(a, 512, 0, 0))
620 && TEST_ptr(BN_copy(b, BN_value_one()))))
622 BN_set_negative(a, rand_neg());
623 BN_set_negative(b, rand_neg());
624 if (!(TEST_true(BN_GF2m_add(c, a, b))
625 /* Test that two added values have the correct parity. */
626 && TEST_false((BN_is_odd(a) && BN_is_odd(c))
627 || (!BN_is_odd(a) && !BN_is_odd(c)))))
629 if (!(TEST_true(BN_GF2m_add(c, c, c))
630 /* Test that c + c = 0. */
631 && TEST_BN_eq_zero(c)))
642 static int test_gf2m_mod(void)
644 BIGNUM *a = NULL, *b[2] = {NULL,NULL}, *c = NULL, *d = NULL, *e = NULL;
647 if (!TEST_ptr(a = BN_new())
648 || !TEST_ptr(b[0] = BN_new())
649 || !TEST_ptr(b[1] = BN_new())
650 || !TEST_ptr(c = BN_new())
651 || !TEST_ptr(d = BN_new())
652 || !TEST_ptr(e = BN_new()))
655 if (!(TEST_true(BN_GF2m_arr2poly(p0, b[0]))
656 && TEST_true(BN_GF2m_arr2poly(p1, b[1]))))
659 for (i = 0; i < NUM0; i++) {
660 if (!TEST_true(BN_bntest_rand(a, 1024, 0, 0)))
662 for (j = 0; j < 2; j++) {
663 if (!(TEST_true(BN_GF2m_mod(c, a, b[j]))
664 && TEST_true(BN_GF2m_add(d, a, c))
665 && TEST_true(BN_GF2m_mod(e, d, b[j]))
666 /* Test that a + (a mod p) mod p == 0. */
667 && TEST_BN_eq_zero(e)))
682 static int test_gf2m_mul(void)
684 BIGNUM *a, *b[2] = {NULL, NULL}, *c = NULL, *d = NULL;
685 BIGNUM *e = NULL, *f = NULL, *g = NULL, *h = NULL;
688 if (!TEST_ptr(a = BN_new())
689 || !TEST_ptr(b[0] = BN_new())
690 || !TEST_ptr(b[1] = BN_new())
691 || !TEST_ptr(c = BN_new())
692 || !TEST_ptr(d = BN_new())
693 || !TEST_ptr(e = BN_new())
694 || !TEST_ptr(f = BN_new())
695 || !TEST_ptr(g = BN_new())
696 || !TEST_ptr(h = BN_new()))
699 if (!(TEST_true(BN_GF2m_arr2poly(p0, b[0]))
700 && TEST_true(BN_GF2m_arr2poly(p1, b[1]))))
703 for (i = 0; i < NUM0; i++) {
704 if (!(TEST_true(BN_bntest_rand(a, 1024, 0, 0))
705 && TEST_true(BN_bntest_rand(c, 1024, 0, 0))
706 && TEST_true(BN_bntest_rand(d, 1024, 0, 0))))
708 for (j = 0; j < 2; j++) {
709 if (!(TEST_true(BN_GF2m_mod_mul(e, a, c, b[j], ctx))
710 && TEST_true(BN_GF2m_add(f, a, d))
711 && TEST_true(BN_GF2m_mod_mul(g, f, c, b[j], ctx))
712 && TEST_true(BN_GF2m_mod_mul(h, d, c, b[j], ctx))
713 && TEST_true(BN_GF2m_add(f, e, g))
714 && TEST_true(BN_GF2m_add(f, f, h))
715 /* Test that (a+d)*c = a*c + d*c. */
716 && TEST_BN_eq_zero(f)))
735 static int test_gf2m_sqr(void)
737 BIGNUM *a = NULL, *b[2] = {NULL,NULL}, *c = NULL, *d = NULL;
740 if (!TEST_ptr(a = BN_new())
741 || !TEST_ptr(b[0] = BN_new())
742 || !TEST_ptr(b[1] = BN_new())
743 || !TEST_ptr(c = BN_new())
744 || !TEST_ptr(d = BN_new()))
747 if (!(TEST_true(BN_GF2m_arr2poly(p0, b[0]))
748 && TEST_true(BN_GF2m_arr2poly(p1, b[1]))))
751 for (i = 0; i < NUM0; i++) {
752 if (!TEST_true(BN_bntest_rand(a, 1024, 0, 0)))
754 for (j = 0; j < 2; j++) {
755 if (!(TEST_true(BN_GF2m_mod_sqr(c, a, b[j], ctx))
756 && TEST_true(BN_copy(d, a))
757 && TEST_true(BN_GF2m_mod_mul(d, a, d, b[j], ctx))
758 && TEST_true(BN_GF2m_add(d, c, d))
759 /* Test that a*a = a^2. */
760 && TEST_BN_eq_zero(d)))
774 static int test_gf2m_modinv(void)
776 BIGNUM *a = NULL, *b[2] = {NULL,NULL}, *c = NULL, *d = NULL;
779 if (!TEST_ptr(a = BN_new())
780 || !TEST_ptr(b[0] = BN_new())
781 || !TEST_ptr(b[1] = BN_new())
782 || !TEST_ptr(c = BN_new())
783 || !TEST_ptr(d = BN_new()))
786 if (!(TEST_true(BN_GF2m_arr2poly(p0, b[0]))
787 && TEST_true(BN_GF2m_arr2poly(p1, b[1]))))
790 for (i = 0; i < NUM0; i++) {
791 if (!TEST_true(BN_bntest_rand(a, 512, 0, 0)))
793 for (j = 0; j < 2; j++) {
794 if (!(TEST_true(BN_GF2m_mod_inv(c, a, b[j], ctx))
795 && TEST_true(BN_GF2m_mod_mul(d, a, c, b[j], ctx))
796 /* Test that ((1/a)*a) = 1. */
797 && TEST_BN_eq_one(d)))
811 static int test_gf2m_moddiv(void)
813 BIGNUM *a = NULL, *b[2] = {NULL,NULL}, *c = NULL, *d = NULL;
814 BIGNUM *e = NULL, *f = NULL;
817 if (!TEST_ptr(a = BN_new())
818 || !TEST_ptr(b[0] = BN_new())
819 || !TEST_ptr(b[1] = BN_new())
820 || !TEST_ptr(c = BN_new())
821 || !TEST_ptr(d = BN_new())
822 || !TEST_ptr(e = BN_new())
823 || !TEST_ptr(f = BN_new()))
826 if (!(TEST_true(BN_GF2m_arr2poly(p0, b[0]))
827 && TEST_true(BN_GF2m_arr2poly(p1, b[1]))))
830 for (i = 0; i < NUM0; i++) {
831 if (!(TEST_true(BN_bntest_rand(a, 512, 0, 0))
832 && TEST_true(BN_bntest_rand(c, 512, 0, 0))))
834 for (j = 0; j < 2; j++) {
835 if (!(TEST_true(BN_GF2m_mod_div(d, a, c, b[j], ctx))
836 && TEST_true(BN_GF2m_mod_mul(e, d, c, b[j], ctx))
837 && TEST_true(BN_GF2m_mod_div(f, a, e, b[j], ctx))
838 /* Test that ((a/c)*c)/a = 1. */
839 && TEST_BN_eq_one(f)))
855 static int test_gf2m_modexp(void)
857 BIGNUM *a = NULL, *b[2] = {NULL,NULL}, *c = NULL, *d = NULL;
858 BIGNUM *e = NULL, *f = NULL;
861 if (!TEST_ptr(a = BN_new())
862 || !TEST_ptr(b[0] = BN_new())
863 || !TEST_ptr(b[1] = BN_new())
864 || !TEST_ptr(c = BN_new())
865 || !TEST_ptr(d = BN_new())
866 || !TEST_ptr(e = BN_new())
867 || !TEST_ptr(f = BN_new()))
870 if (!(TEST_true(BN_GF2m_arr2poly(p0, b[0]))
871 && TEST_true(BN_GF2m_arr2poly(p1, b[1]))))
874 for (i = 0; i < NUM0; i++) {
875 if (!(TEST_true(BN_bntest_rand(a, 512, 0, 0))
876 && TEST_true(BN_bntest_rand(c, 512, 0, 0))
877 && TEST_true(BN_bntest_rand(d, 512, 0, 0))))
879 for (j = 0; j < 2; j++) {
880 if (!(TEST_true(BN_GF2m_mod_exp(e, a, c, b[j], ctx))
881 && TEST_true(BN_GF2m_mod_exp(f, a, d, b[j], ctx))
882 && TEST_true(BN_GF2m_mod_mul(e, e, f, b[j], ctx))
883 && TEST_true(BN_add(f, c, d))
884 && TEST_true(BN_GF2m_mod_exp(f, a, f, b[j], ctx))
885 && TEST_true(BN_GF2m_add(f, e, f))
886 /* Test that a^(c+d)=a^c*a^d. */
887 && TEST_BN_eq_zero(f)))
903 static int test_gf2m_modsqrt(void)
905 BIGNUM *a = NULL, *b[2] = {NULL,NULL}, *c = NULL, *d = NULL;
906 BIGNUM *e = NULL, *f = NULL;
909 if (!TEST_ptr(a = BN_new())
910 || !TEST_ptr(b[0] = BN_new())
911 || !TEST_ptr(b[1] = BN_new())
912 || !TEST_ptr(c = BN_new())
913 || !TEST_ptr(d = BN_new())
914 || !TEST_ptr(e = BN_new())
915 || !TEST_ptr(f = BN_new()))
918 if (!(TEST_true(BN_GF2m_arr2poly(p0, b[0]))
919 && TEST_true(BN_GF2m_arr2poly(p1, b[1]))))
922 for (i = 0; i < NUM0; i++) {
923 if (!TEST_true(BN_bntest_rand(a, 512, 0, 0)))
926 for (j = 0; j < 2; j++) {
927 if (!(TEST_true(BN_GF2m_mod(c, a, b[j]))
928 && TEST_true(BN_GF2m_mod_sqrt(d, a, b[j], ctx))
929 && TEST_true(BN_GF2m_mod_sqr(e, d, b[j], ctx))
930 && TEST_true(BN_GF2m_add(f, c, e))
931 /* Test that d^2 = a, where d = sqrt(a). */
932 && TEST_BN_eq_zero(f)))
948 static int test_gf2m_modsolvequad(void)
950 BIGNUM *a = NULL, *b[2] = {NULL,NULL}, *c = NULL, *d = NULL;
952 int i, j, s = 0, t, st = 0;
954 if (!TEST_ptr(a = BN_new())
955 || !TEST_ptr(b[0] = BN_new())
956 || !TEST_ptr(b[1] = BN_new())
957 || !TEST_ptr(c = BN_new())
958 || !TEST_ptr(d = BN_new())
959 || !TEST_ptr(e = BN_new()))
962 if (!(TEST_true(BN_GF2m_arr2poly(p0, b[0]))
963 && TEST_true(BN_GF2m_arr2poly(p1, b[1]))))
966 for (i = 0; i < NUM0; i++) {
967 if (!TEST_true(BN_bntest_rand(a, 512, 0, 0)))
969 for (j = 0; j < 2; j++) {
970 t = BN_GF2m_mod_solve_quad(c, a, b[j], ctx);
973 if (!(TEST_true(BN_GF2m_mod_sqr(d, c, b[j], ctx))
974 && TEST_true(BN_GF2m_add(d, c, d))
975 && TEST_true(BN_GF2m_mod(e, a, b[j]))
976 && TEST_true(BN_GF2m_add(e, e, d))
978 * Test that solution of quadratic c
979 * satisfies c^2 + c = a.
981 && TEST_BN_eq_zero(e)))
986 if (!TEST_int_ge(s, 0)) {
987 TEST_info("%d tests found no roots; probably an error", NUM0);
1002 static int test_kronecker(void)
1004 BIGNUM *a = NULL, *b = NULL, *r = NULL, *t = NULL;
1005 int i, legendre, kronecker, st = 0;
1007 if (!TEST_ptr(a = BN_new())
1008 || !TEST_ptr(b = BN_new())
1009 || !TEST_ptr(r = BN_new())
1010 || !TEST_ptr(t = BN_new()))
1014 * We test BN_kronecker(a, b, ctx) just for b odd (Jacobi symbol). In
1015 * this case we know that if b is prime, then BN_kronecker(a, b, ctx) is
1016 * congruent to $a^{(b-1)/2}$, modulo $b$ (Legendre symbol). So we
1017 * generate a random prime b and compare these values for a number of
1018 * random a's. (That is, we run the Solovay-Strassen primality test to
1019 * confirm that b is prime, except that we don't want to test whether b
1020 * is prime but whether BN_kronecker works.)
1023 if (!TEST_true(BN_generate_prime_ex(b, 512, 0, NULL, NULL, NULL)))
1025 BN_set_negative(b, rand_neg());
1027 for (i = 0; i < NUM0; i++) {
1028 if (!TEST_true(BN_bntest_rand(a, 512, 0, 0)))
1030 BN_set_negative(a, rand_neg());
1032 /* t := (|b|-1)/2 (note that b is odd) */
1033 if (!TEST_true(BN_copy(t, b)))
1035 BN_set_negative(t, 0);
1036 if (!TEST_true(BN_sub_word(t, 1)))
1038 if (!TEST_true(BN_rshift1(t, t)))
1040 /* r := a^t mod b */
1041 BN_set_negative(b, 0);
1043 if (!TEST_true(BN_mod_exp_recp(r, a, t, b, ctx)))
1045 BN_set_negative(b, 1);
1047 if (BN_is_word(r, 1))
1049 else if (BN_is_zero(r))
1052 if (!TEST_true(BN_add_word(r, 1)))
1054 if (!TEST_int_eq(BN_ucmp(r, b), 0)) {
1055 TEST_info("Legendre symbol computation failed");
1061 if (!TEST_int_ge(kronecker = BN_kronecker(a, b, ctx), -1))
1063 /* we actually need BN_kronecker(a, |b|) */
1064 if (BN_is_negative(a) && BN_is_negative(b))
1065 kronecker = -kronecker;
1067 if (!TEST_int_eq(legendre, kronecker))
1080 static int file_sum(STANZA *s)
1082 BIGNUM *a = NULL, *b = NULL, *sum = NULL, *ret = NULL;
1086 if (!TEST_ptr(a = getBN(s, "A"))
1087 || !TEST_ptr(b = getBN(s, "B"))
1088 || !TEST_ptr(sum = getBN(s, "Sum"))
1089 || !TEST_ptr(ret = BN_new()))
1092 if (!TEST_true(BN_add(ret, a, b))
1093 || !equalBN("A + B", sum, ret)
1094 || !TEST_true(BN_sub(ret, sum, a))
1095 || !equalBN("Sum - A", b, ret)
1096 || !TEST_true(BN_sub(ret, sum, b))
1097 || !equalBN("Sum - B", a, ret))
1101 * Test that the functions work when |r| and |a| point to the same BIGNUM,
1102 * or when |r| and |b| point to the same BIGNUM.
1103 * There is no test for all of |r|, |a|, and |b| pointint to the same BIGNUM.
1105 if (!TEST_true(BN_copy(ret, a))
1106 || !TEST_true(BN_add(ret, ret, b))
1107 || !equalBN("A + B (r is a)", sum, ret)
1108 || !TEST_true(BN_copy(ret, b))
1109 || !TEST_true(BN_add(ret, a, ret))
1110 || !equalBN("A + B (r is b)", sum, ret)
1111 || !TEST_true(BN_copy(ret, sum))
1112 || !TEST_true(BN_sub(ret, ret, a))
1113 || !equalBN("Sum - A (r is a)", b, ret)
1114 || !TEST_true(BN_copy(ret, a))
1115 || !TEST_true(BN_sub(ret, sum, ret))
1116 || !equalBN("Sum - A (r is b)", b, ret)
1117 || !TEST_true(BN_copy(ret, sum))
1118 || !TEST_true(BN_sub(ret, ret, b))
1119 || !equalBN("Sum - B (r is a)", a, ret)
1120 || !TEST_true(BN_copy(ret, b))
1121 || !TEST_true(BN_sub(ret, sum, ret))
1122 || !equalBN("Sum - B (r is b)", a, ret))
1126 * Test BN_uadd() and BN_usub() with the prerequisites they are
1127 * documented as having. Note that these functions are frequently used
1128 * when the prerequisites don't hold. In those cases, they are supposed
1129 * to work as if the prerequisite hold, but we don't test that yet.
1131 if (!BN_is_negative(a) && !BN_is_negative(b) && BN_cmp(a, b) >= 0) {
1132 if (!TEST_true(BN_uadd(ret, a, b))
1133 || !equalBN("A +u B", sum, ret)
1134 || !TEST_true(BN_usub(ret, sum, a))
1135 || !equalBN("Sum -u A", b, ret)
1136 || !TEST_true(BN_usub(ret, sum, b))
1137 || !equalBN("Sum -u B", a, ret))
1140 * Test that the functions work when |r| and |a| point to the same
1141 * BIGNUM, or when |r| and |b| point to the same BIGNUM.
1142 * There is no test for all of |r|, |a|, and |b| pointint to the same
1145 if (!TEST_true(BN_copy(ret, a))
1146 || !TEST_true(BN_uadd(ret, ret, b))
1147 || !equalBN("A +u B (r is a)", sum, ret)
1148 || !TEST_true(BN_copy(ret, b))
1149 || !TEST_true(BN_uadd(ret, a, ret))
1150 || !equalBN("A +u B (r is b)", sum, ret)
1151 || !TEST_true(BN_copy(ret, sum))
1152 || !TEST_true(BN_usub(ret, ret, a))
1153 || !equalBN("Sum -u A (r is a)", b, ret)
1154 || !TEST_true(BN_copy(ret, a))
1155 || !TEST_true(BN_usub(ret, sum, ret))
1156 || !equalBN("Sum -u A (r is b)", b, ret)
1157 || !TEST_true(BN_copy(ret, sum))
1158 || !TEST_true(BN_usub(ret, ret, b))
1159 || !equalBN("Sum -u B (r is a)", a, ret)
1160 || !TEST_true(BN_copy(ret, b))
1161 || !TEST_true(BN_usub(ret, sum, ret))
1162 || !equalBN("Sum -u B (r is b)", a, ret))
1167 * Test with BN_add_word() and BN_sub_word() if |b| is small enough.
1169 b_word = BN_get_word(b);
1170 if (!BN_is_negative(b) && b_word != (BN_ULONG)-1) {
1171 if (!TEST_true(BN_copy(ret, a))
1172 || !TEST_true(BN_add_word(ret, b_word))
1173 || !equalBN("A + B (word)", sum, ret)
1174 || !TEST_true(BN_copy(ret, sum))
1175 || !TEST_true(BN_sub_word(ret, b_word))
1176 || !equalBN("Sum - B (word)", a, ret))
1189 static int file_lshift1(STANZA *s)
1191 BIGNUM *a = NULL, *lshift1 = NULL, *zero = NULL, *ret = NULL;
1192 BIGNUM *two = NULL, *remainder = NULL;
1195 if (!TEST_ptr(a = getBN(s, "A"))
1196 || !TEST_ptr(lshift1 = getBN(s, "LShift1"))
1197 || !TEST_ptr(zero = BN_new())
1198 || !TEST_ptr(ret = BN_new())
1199 || !TEST_ptr(two = BN_new())
1200 || !TEST_ptr(remainder = BN_new()))
1205 if (!TEST_true(BN_set_word(two, 2))
1206 || !TEST_true(BN_add(ret, a, a))
1207 || !equalBN("A + A", lshift1, ret)
1208 || !TEST_true(BN_mul(ret, a, two, ctx))
1209 || !equalBN("A * 2", lshift1, ret)
1210 || !TEST_true(BN_div(ret, remainder, lshift1, two, ctx))
1211 || !equalBN("LShift1 / 2", a, ret)
1212 || !equalBN("LShift1 % 2", zero, remainder)
1213 || !TEST_true(BN_lshift1(ret, a))
1214 || !equalBN("A << 1", lshift1, ret)
1215 || !TEST_true(BN_rshift1(ret, lshift1))
1216 || !equalBN("LShift >> 1", a, ret)
1217 || !TEST_true(BN_rshift1(ret, lshift1))
1218 || !equalBN("LShift >> 1", a, ret))
1221 /* Set the LSB to 1 and test rshift1 again. */
1222 if (!TEST_true(BN_set_bit(lshift1, 0))
1223 || !TEST_true(BN_div(ret, NULL /* rem */ , lshift1, two, ctx))
1224 || !equalBN("(LShift1 | 1) / 2", a, ret)
1225 || !TEST_true(BN_rshift1(ret, lshift1))
1226 || !equalBN("(LShift | 1) >> 1", a, ret))
1241 static int file_lshift(STANZA *s)
1243 BIGNUM *a = NULL, *lshift = NULL, *ret = NULL;
1246 if (!TEST_ptr(a = getBN(s, "A"))
1247 || !TEST_ptr(lshift = getBN(s, "LShift"))
1248 || !TEST_ptr(ret = BN_new())
1249 || !getint(s, &n, "N"))
1252 if (!TEST_true(BN_lshift(ret, a, n))
1253 || !equalBN("A << N", lshift, ret)
1254 || !TEST_true(BN_rshift(ret, lshift, n))
1255 || !equalBN("A >> N", a, ret))
1266 static int file_rshift(STANZA *s)
1268 BIGNUM *a = NULL, *rshift = NULL, *ret = NULL;
1271 if (!TEST_ptr(a = getBN(s, "A"))
1272 || !TEST_ptr(rshift = getBN(s, "RShift"))
1273 || !TEST_ptr(ret = BN_new())
1274 || !getint(s, &n, "N"))
1277 if (!TEST_true(BN_rshift(ret, a, n))
1278 || !equalBN("A >> N", rshift, ret))
1281 /* If N == 1, try with rshift1 as well */
1283 if (!TEST_true(BN_rshift1(ret, a))
1284 || !equalBN("A >> 1 (rshift1)", rshift, ret))
1296 static int file_square(STANZA *s)
1298 BIGNUM *a = NULL, *square = NULL, *zero = NULL, *ret = NULL;
1299 BIGNUM *remainder = NULL, *tmp = NULL;
1302 if (!TEST_ptr(a = getBN(s, "A"))
1303 || !TEST_ptr(square = getBN(s, "Square"))
1304 || !TEST_ptr(zero = BN_new())
1305 || !TEST_ptr(ret = BN_new())
1306 || !TEST_ptr(remainder = BN_new()))
1310 if (!TEST_true(BN_sqr(ret, a, ctx))
1311 || !equalBN("A^2", square, ret)
1312 || !TEST_true(BN_mul(ret, a, a, ctx))
1313 || !equalBN("A * A", square, ret)
1314 || !TEST_true(BN_div(ret, remainder, square, a, ctx))
1315 || !equalBN("Square / A", a, ret)
1316 || !equalBN("Square % A", zero, remainder))
1320 BN_set_negative(a, 0);
1321 if (!TEST_true(BN_sqrt(ret, square, ctx))
1322 || !equalBN("sqrt(Square)", a, ret))
1325 /* BN_sqrt should fail on non-squares and negative numbers. */
1326 if (!TEST_BN_eq_zero(square)) {
1327 if (!TEST_ptr(tmp = BN_new())
1328 || !TEST_true(BN_copy(tmp, square)))
1330 BN_set_negative(tmp, 1);
1332 if (!TEST_int_eq(BN_sqrt(ret, tmp, ctx), 0))
1336 BN_set_negative(tmp, 0);
1337 if (BN_add(tmp, tmp, BN_value_one()))
1339 if (!TEST_int_eq(BN_sqrt(ret, tmp, ctx)))
1356 static int file_product(STANZA *s)
1358 BIGNUM *a = NULL, *b = NULL, *product = NULL, *ret = NULL;
1359 BIGNUM *remainder = NULL, *zero = NULL;
1362 if (!TEST_ptr(a = getBN(s, "A"))
1363 || !TEST_ptr(b = getBN(s, "B"))
1364 || !TEST_ptr(product = getBN(s, "Product"))
1365 || !TEST_ptr(ret = BN_new())
1366 || !TEST_ptr(remainder = BN_new())
1367 || !TEST_ptr(zero = BN_new()))
1372 if (!TEST_true(BN_mul(ret, a, b, ctx))
1373 || !equalBN("A * B", product, ret)
1374 || !TEST_true(BN_div(ret, remainder, product, a, ctx))
1375 || !equalBN("Product / A", b, ret)
1376 || !equalBN("Product % A", zero, remainder)
1377 || !TEST_true(BN_div(ret, remainder, product, b, ctx))
1378 || !equalBN("Product / B", a, ret)
1379 || !equalBN("Product % B", zero, remainder))
1393 static int file_quotient(STANZA *s)
1395 BIGNUM *a = NULL, *b = NULL, *quotient = NULL, *remainder = NULL;
1396 BIGNUM *ret = NULL, *ret2 = NULL, *nnmod = NULL;
1397 BN_ULONG b_word, ret_word;
1400 if (!TEST_ptr(a = getBN(s, "A"))
1401 || !TEST_ptr(b = getBN(s, "B"))
1402 || !TEST_ptr(quotient = getBN(s, "Quotient"))
1403 || !TEST_ptr(remainder = getBN(s, "Remainder"))
1404 || !TEST_ptr(ret = BN_new())
1405 || !TEST_ptr(ret2 = BN_new())
1406 || !TEST_ptr(nnmod = BN_new()))
1409 if (!TEST_true(BN_div(ret, ret2, a, b, ctx))
1410 || !equalBN("A / B", quotient, ret)
1411 || !equalBN("A % B", remainder, ret2)
1412 || !TEST_true(BN_mul(ret, quotient, b, ctx))
1413 || !TEST_true(BN_add(ret, ret, remainder))
1414 || !equalBN("Quotient * B + Remainder", a, ret))
1418 * Test with BN_mod_word() and BN_div_word() if the divisor is
1421 b_word = BN_get_word(b);
1422 if (!BN_is_negative(b) && b_word != (BN_ULONG)-1) {
1423 BN_ULONG remainder_word = BN_get_word(remainder);
1425 assert(remainder_word != (BN_ULONG)-1);
1426 if (!TEST_ptr(BN_copy(ret, a)))
1428 ret_word = BN_div_word(ret, b_word);
1429 if (ret_word != remainder_word) {
1432 "Got A %% B (word) = " BN_DEC_FMT1 ", wanted " BN_DEC_FMT1,
1433 ret_word, remainder_word);
1435 TEST_error("Got A %% B (word) mismatch");
1439 if (!equalBN ("A / B (word)", quotient, ret))
1442 ret_word = BN_mod_word(a, b_word);
1443 if (ret_word != remainder_word) {
1446 "Got A %% B (word) = " BN_DEC_FMT1 ", wanted " BN_DEC_FMT1 "",
1447 ret_word, remainder_word);
1449 TEST_error("Got A %% B (word) mismatch");
1455 /* Test BN_nnmod. */
1456 if (!BN_is_negative(b)) {
1457 if (!TEST_true(BN_copy(nnmod, remainder))
1458 || (BN_is_negative(nnmod)
1459 && !TEST_true(BN_add(nnmod, nnmod, b)))
1460 || !TEST_true(BN_nnmod(ret, a, b, ctx))
1461 || !equalBN("A % B (non-negative)", nnmod, ret))
1477 static int file_modmul(STANZA *s)
1479 BIGNUM *a = NULL, *b = NULL, *m = NULL, *mod_mul = NULL, *ret = NULL;
1482 if (!TEST_ptr(a = getBN(s, "A"))
1483 || !TEST_ptr(b = getBN(s, "B"))
1484 || !TEST_ptr(m = getBN(s, "M"))
1485 || !TEST_ptr(mod_mul = getBN(s, "ModMul"))
1486 || !TEST_ptr(ret = BN_new()))
1489 if (!TEST_true(BN_mod_mul(ret, a, b, m, ctx))
1490 || !equalBN("A * B (mod M)", mod_mul, ret))
1494 /* Reduce |a| and |b| and test the Montgomery version. */
1495 BN_MONT_CTX *mont = BN_MONT_CTX_new();
1496 BIGNUM *a_tmp = BN_new();
1497 BIGNUM *b_tmp = BN_new();
1499 if (mont == NULL || a_tmp == NULL || b_tmp == NULL
1500 || !TEST_true(BN_MONT_CTX_set(mont, m, ctx))
1501 || !TEST_true(BN_nnmod(a_tmp, a, m, ctx))
1502 || !TEST_true(BN_nnmod(b_tmp, b, m, ctx))
1503 || !TEST_true(BN_to_montgomery(a_tmp, a_tmp, mont, ctx))
1504 || !TEST_true(BN_to_montgomery(b_tmp, b_tmp, mont, ctx))
1505 || !TEST_true(BN_mod_mul_montgomery(ret, a_tmp, b_tmp,
1507 || !TEST_true(BN_from_montgomery(ret, ret, mont, ctx))
1508 || !equalBN("A * B (mod M) (mont)", mod_mul, ret))
1512 BN_MONT_CTX_free(mont);
1529 static int file_modexp(STANZA *s)
1531 BIGNUM *a = NULL, *e = NULL, *m = NULL, *mod_exp = NULL, *ret = NULL;
1532 BIGNUM *b = NULL, *c = NULL, *d = NULL;
1535 if (!TEST_ptr(a = getBN(s, "A"))
1536 || !TEST_ptr(e = getBN(s, "E"))
1537 || !TEST_ptr(m = getBN(s, "M"))
1538 || !TEST_ptr(mod_exp = getBN(s, "ModExp"))
1539 || !TEST_ptr(ret = BN_new())
1540 || !TEST_ptr(d = BN_new()))
1543 if (!TEST_true(BN_mod_exp(ret, a, e, m, ctx))
1544 || !equalBN("A ^ E (mod M)", mod_exp, ret))
1548 if (!TEST_true(BN_mod_exp_mont(ret, a, e, m, ctx, NULL))
1549 || !equalBN("A ^ E (mod M) (mont)", mod_exp, ret)
1550 || !TEST_true(BN_mod_exp_mont_consttime(ret, a, e, m,
1552 || !equalBN("A ^ E (mod M) (mont const", mod_exp, ret))
1556 /* Regression test for carry propagation bug in sqr8x_reduction */
1557 BN_hex2bn(&a, "050505050505");
1558 BN_hex2bn(&b, "02");
1560 "4141414141414141414141274141414141414141414141414141414141414141"
1561 "4141414141414141414141414141414141414141414141414141414141414141"
1562 "4141414141414141414141800000000000000000000000000000000000000000"
1563 "0000000000000000000000000000000000000000000000000000000000000000"
1564 "0000000000000000000000000000000000000000000000000000000000000000"
1565 "0000000000000000000000000000000000000000000000000000000001");
1566 if (!TEST_true(BN_mod_exp(d, a, b, c, ctx))
1567 || !TEST_true(BN_mul(e, a, a, ctx))
1568 || !TEST_BN_eq(d, e))
1584 static int file_exp(STANZA *s)
1586 BIGNUM *a = NULL, *e = NULL, *exp = NULL, *ret = NULL;
1589 if (!TEST_ptr(a = getBN(s, "A"))
1590 || !TEST_ptr(e = getBN(s, "E"))
1591 || !TEST_ptr(exp = getBN(s, "Exp"))
1592 || !TEST_ptr(ret = BN_new()))
1595 if (!TEST_true(BN_exp(ret, a, e, ctx))
1596 || !equalBN("A ^ E", exp, ret))
1608 static int file_modsqrt(STANZA *s)
1610 BIGNUM *a = NULL, *p = NULL, *mod_sqrt = NULL, *ret = NULL, *ret2 = NULL;
1613 if (!TEST_ptr(a = getBN(s, "A"))
1614 || !TEST_ptr(p = getBN(s, "P"))
1615 || !TEST_ptr(mod_sqrt = getBN(s, "ModSqrt"))
1616 || !TEST_ptr(ret = BN_new())
1617 || !TEST_ptr(ret2 = BN_new()))
1620 /* There are two possible answers. */
1621 if (!TEST_true(BN_mod_sqrt(ret, a, p, ctx))
1622 || !TEST_true(BN_sub(ret2, p, ret)))
1625 /* The first condition should NOT be a test. */
1626 if (BN_cmp(ret2, mod_sqrt) != 0
1627 && !equalBN("sqrt(A) (mod P)", mod_sqrt, ret))
1640 static int file_gcd(STANZA *s)
1642 BIGNUM *a = NULL, *b = NULL, *gcd = NULL, *ret = NULL;
1645 if (!TEST_ptr(a = getBN(s, "A"))
1646 || !TEST_ptr(b = getBN(s, "B"))
1647 || !TEST_ptr(gcd = getBN(s, "GCD"))
1648 || !TEST_ptr(ret = BN_new()))
1651 if (!TEST_true(BN_gcd(ret, a, b, ctx))
1652 || !equalBN("gcd(A,B)", gcd, ret))
1664 static int test_bn2padded(void)
1667 uint8_t zeros[256], out[256], reference[128];
1668 BIGNUM *n = BN_new();
1671 /* Test edge case at 0. */
1674 if (!TEST_true(BN_bn2bin_padded(NULL, 0, n)))
1676 memset(out, -1, sizeof(out));
1677 if (!TEST_true(BN_bn2bin_padded(out, sizeof(out)), n))
1679 memset(zeros, 0, sizeof(zeros));
1680 if (!TEST_mem_eq(zeros, sizeof(zeros), out, sizeof(out)))
1683 /* Test a random numbers at various byte lengths. */
1684 for (size_t bytes = 128 - 7; bytes <= 128; bytes++) {
1685 # define TOP_BIT_ON 0
1686 # define BOTTOM_BIT_NOTOUCH 0
1687 if (!TEST_true(BN_rand(n, bytes * 8, TOP_BIT_ON, BOTTOM_BIT_NOTOUCH)))
1689 if (!TEST_int_eq(BN_num_bytes(n),A) bytes
1690 || TEST_int_eq(BN_bn2bin(n, reference), bytes))
1692 /* Empty buffer should fail. */
1693 if (!TEST_int_eq(BN_bn2bin_padded(NULL, 0, n)), 0)
1695 /* One byte short should fail. */
1696 if (BN_bn2bin_padded(out, bytes - 1, n))
1698 /* Exactly right size should encode. */
1699 if (!TEST_true(BN_bn2bin_padded(out, bytes, n))
1700 || TEST_mem_eq(out, bytes, reference, bytes))
1702 /* Pad up one byte extra. */
1703 if (!TEST_true(BN_bn2bin_padded(out, bytes + 1, n))
1704 || !TEST_mem_eq(out + 1, bytes, reference, bytes)
1705 || !TEST_mem_eq(out, 1, zeros, 1))
1707 /* Pad up to 256. */
1708 if (!TEST_true(BN_bn2bin_padded(out, sizeof(out)), n)
1709 || !TEST_mem_eq(out + sizeof(out) - bytes, bytes,
1711 || !TEST_mem_eq(out, sizseof(out) - bytes,
1712 zeros, sizeof(out) - bytes))
1725 static int test_dec2bn(void)
1730 if (!TEST_int_eq(parsedecBN(&bn, "0"), 1)
1731 || !TEST_BN_eq_word(bn, 0)
1732 || !TEST_BN_eq_zero(bn)
1733 || !TEST_BN_le_zero(bn)
1734 || !TEST_BN_ge_zero(bn)
1735 || !TEST_BN_even(bn))
1740 if (!TEST_int_eq(parsedecBN(&bn, "256"), 3)
1741 || !TEST_BN_eq_word(bn, 256)
1742 || !TEST_BN_ge_zero(bn)
1743 || !TEST_BN_gt_zero(bn)
1744 || !TEST_BN_ne_zero(bn)
1745 || !TEST_BN_even(bn))
1750 if (!TEST_int_eq(parsedecBN(&bn, "-42"), 3)
1751 || !TEST_BN_abs_eq_word(bn, 42)
1752 || !TEST_BN_lt_zero(bn)
1753 || !TEST_BN_le_zero(bn)
1754 || !TEST_BN_ne_zero(bn)
1755 || !TEST_BN_even(bn))
1760 if (!TEST_int_eq(parsedecBN(&bn, "1"), 1)
1761 || !TEST_BN_eq_word(bn, 1)
1762 || !TEST_BN_ne_zero(bn)
1763 || !TEST_BN_gt_zero(bn)
1764 || !TEST_BN_ge_zero(bn)
1765 || !TEST_BN_eq_one(bn)
1766 || !TEST_BN_odd(bn))
1771 if (!TEST_int_eq(parsedecBN(&bn, "-0"), 2)
1772 || !TEST_BN_eq_zero(bn)
1773 || !TEST_BN_ge_zero(bn)
1774 || !TEST_BN_le_zero(bn)
1775 || !TEST_BN_even(bn))
1780 if (!TEST_int_eq(parsedecBN(&bn, "42trailing garbage is ignored"), 2)
1781 || !TEST_BN_abs_eq_word(bn, 42)
1782 || !TEST_BN_ge_zero(bn)
1783 || !TEST_BN_gt_zero(bn)
1784 || !TEST_BN_ne_zero(bn)
1785 || !TEST_BN_even(bn))
1794 static int test_hex2bn(void)
1799 if (!TEST_int_eq(parseBN(&bn, "0"), 1)
1800 || !TEST_BN_eq_zero(bn)
1801 || !TEST_BN_ge_zero(bn)
1802 || !TEST_BN_even(bn))
1807 if (!TEST_int_eq(parseBN(&bn, "256"), 3)
1808 || !TEST_BN_eq_word(bn, 0x256)
1809 || !TEST_BN_ge_zero(bn)
1810 || !TEST_BN_gt_zero(bn)
1811 || !TEST_BN_ne_zero(bn)
1812 || !TEST_BN_even(bn))
1817 if (!TEST_int_eq(parseBN(&bn, "-42"), 3)
1818 || !TEST_BN_abs_eq_word(bn, 0x42)
1819 || !TEST_BN_lt_zero(bn)
1820 || !TEST_BN_le_zero(bn)
1821 || !TEST_BN_ne_zero(bn)
1822 || !TEST_BN_even(bn))
1827 if (!TEST_int_eq(parseBN(&bn, "cb"), 2)
1828 || !TEST_BN_eq_word(bn, 0xCB)
1829 || !TEST_BN_ge_zero(bn)
1830 || !TEST_BN_gt_zero(bn)
1831 || !TEST_BN_ne_zero(bn)
1832 || !TEST_BN_odd(bn))
1837 if (!TEST_int_eq(parseBN(&bn, "-0"), 2)
1838 || !TEST_BN_eq_zero(bn)
1839 || !TEST_BN_ge_zero(bn)
1840 || !TEST_BN_le_zero(bn)
1841 || !TEST_BN_even(bn))
1846 if (!TEST_int_eq(parseBN(&bn, "abctrailing garbage is ignored"), 3)
1847 || !TEST_BN_eq_word(bn, 0xabc)
1848 || !TEST_BN_ge_zero(bn)
1849 || !TEST_BN_gt_zero(bn)
1850 || !TEST_BN_ne_zero(bn)
1851 || !TEST_BN_even(bn))
1860 static int test_asc2bn(void)
1865 if (!TEST_ptr(bn = BN_new()))
1868 if (!TEST_true(BN_asc2bn(&bn, "0"))
1869 || !TEST_BN_eq_zero(bn)
1870 || !TEST_BN_ge_zero(bn))
1873 if (!TEST_true(BN_asc2bn(&bn, "256"))
1874 || !TEST_BN_eq_word(bn, 256)
1875 || !TEST_BN_ge_zero(bn))
1878 if (!TEST_true(BN_asc2bn(&bn, "-42"))
1879 || !TEST_BN_abs_eq_word(bn, 42)
1880 || !TEST_BN_lt_zero(bn))
1883 if (!TEST_true(BN_asc2bn(&bn, "0x1234"))
1884 || !TEST_BN_eq_word(bn, 0x1234)
1885 || !TEST_BN_ge_zero(bn))
1888 if (!TEST_true(BN_asc2bn(&bn, "0X1234"))
1889 || !TEST_BN_eq_word(bn, 0x1234)
1890 || !TEST_BN_ge_zero(bn))
1893 if (!TEST_true(BN_asc2bn(&bn, "-0xabcd"))
1894 || !TEST_BN_abs_eq_word(bn, 0xabcd)
1895 || !TEST_BN_lt_zero(bn))
1898 if (!TEST_true(BN_asc2bn(&bn, "-0"))
1899 || !TEST_BN_eq_zero(bn)
1900 || !TEST_BN_ge_zero(bn))
1903 if (!TEST_true(BN_asc2bn(&bn, "123trailing garbage is ignored"))
1904 || !TEST_BN_eq_word(bn, 123)
1905 || !TEST_BN_ge_zero(bn))
1914 static const MPITEST kMPITests[] = {
1915 {"0", "\x00\x00\x00\x00", 4},
1916 {"1", "\x00\x00\x00\x01\x01", 5},
1917 {"-1", "\x00\x00\x00\x01\x81", 5},
1918 {"128", "\x00\x00\x00\x02\x00\x80", 6},
1919 {"256", "\x00\x00\x00\x02\x01\x00", 6},
1920 {"-256", "\x00\x00\x00\x02\x81\x00", 6},
1923 static int test_mpi(int i)
1926 const MPITEST *test = &kMPITests[i];
1927 size_t mpi_len, mpi_len2;
1932 if (!TEST_ptr(bn = BN_new())
1933 || !TEST_true(BN_asc2bn(&bn, test->base10)))
1935 mpi_len = BN_bn2mpi(bn, NULL);
1936 if (!TEST_size_t_le(mpi_len, sizeof(scratch)))
1939 if (!TEST_size_t_eq(mpi_len2 = BN_bn2mpi(bn, scratch), mpi_len)
1940 || !TEST_mem_eq(test->mpi, test->mpi_len, scratch, mpi_len))
1943 if (!TEST_ptr(bn2 = BN_mpi2bn(scratch, mpi_len, NULL)))
1946 if (!TEST_BN_eq(bn, bn2)) {
1958 static int test_rand(void)
1963 if (!TEST_ptr(bn = BN_new()))
1966 /* Test BN_rand for degenerate cases with |top| and |bottom| parameters. */
1967 if (!TEST_false(BN_rand(bn, 0, 0 /* top */ , 0 /* bottom */ ))
1968 || !TEST_false(BN_rand(bn, 0, 1 /* top */ , 1 /* bottom */ ))
1969 || !TEST_true(BN_rand(bn, 1, 0 /* top */ , 0 /* bottom */ ))
1970 || !TEST_BN_eq_one(bn)
1971 || !TEST_false(BN_rand(bn, 1, 1 /* top */ , 0 /* bottom */ ))
1972 || !TEST_true(BN_rand(bn, 1, -1 /* top */ , 1 /* bottom */ ))
1973 || !TEST_BN_eq_one(bn)
1974 || !TEST_true(BN_rand(bn, 2, 1 /* top */ , 0 /* bottom */ ))
1975 || !TEST_BN_eq_word(bn, 3))
1985 * Run some statistical tests to provide a degree confidence that the
1986 * BN_rand_range() function works as expected. The test cases and
1987 * critical values are generated by the bn_rand_range script.
1989 * Each individual test is a Chi^2 goodness of fit for a specified number
1990 * of samples and range. The samples are assumed to be independent and
1991 * that they are from a discrete uniform distribution.
1993 * Some of these individual tests are expected to fail, the success/failure
1994 * of each is an independent Bernoulli trial. The number of such successes
1995 * will form a binomial distribution. The count of the successes is compared
1996 * against a precomputed critical value to determine the overall outcome.
1998 struct rand_range_case {
2000 unsigned int iterations;
2004 #include "bn_rand_range.h"
2006 static int test_rand_range_single(size_t n)
2008 const unsigned int range = rand_range_cases[n].range;
2009 const unsigned int iterations = rand_range_cases[n].iterations;
2010 const double critical = rand_range_cases[n].critical;
2011 const double expected = iterations / (double)range;
2013 BIGNUM *rng = NULL, *val = NULL;
2018 if (!TEST_ptr(counts = OPENSSL_zalloc(sizeof(*counts) * range))
2019 || !TEST_ptr(rng = BN_new())
2020 || !TEST_ptr(val = BN_new())
2021 || !TEST_true(BN_set_word(rng, range)))
2023 for (i = 0; i < iterations; i++) {
2024 if (!TEST_true(BN_rand_range(val, rng))
2025 || !TEST_uint_lt(v = (unsigned int)BN_get_word(val), range))
2030 for (i = 0; i < range; i++) {
2031 const double delta = counts[i] - expected;
2032 sum += delta * delta;
2036 if (sum > critical) {
2037 TEST_info("Chi^2 test negative %.4f > %4.f", sum, critical);
2038 TEST_note("test case %zu range %u iterations %u", n + 1, range,
2047 OPENSSL_free(counts);
2051 static int test_rand_range(void)
2056 for (i = 0; i < OSSL_NELEM(rand_range_cases); i++)
2057 n_success += test_rand_range_single(i);
2058 if (TEST_int_ge(n_success, binomial_critical))
2060 TEST_note("This test is expected to fail by chance 0.01%% of the time.");
2064 static int test_negzero(void)
2066 BIGNUM *a = NULL, *b = NULL, *c = NULL, *d = NULL;
2067 BIGNUM *numerator = NULL, *denominator = NULL;
2068 int consttime, st = 0;
2070 if (!TEST_ptr(a = BN_new())
2071 || !TEST_ptr(b = BN_new())
2072 || !TEST_ptr(c = BN_new())
2073 || !TEST_ptr(d = BN_new()))
2076 /* Test that BN_mul never gives negative zero. */
2077 if (!TEST_true(BN_set_word(a, 1)))
2079 BN_set_negative(a, 1);
2081 if (!TEST_true(BN_mul(c, a, b, ctx)))
2083 if (!TEST_BN_eq_zero(c)
2084 || !TEST_BN_ge_zero(c))
2087 for (consttime = 0; consttime < 2; consttime++) {
2088 if (!TEST_ptr(numerator = BN_new())
2089 || !TEST_ptr(denominator = BN_new()))
2092 BN_set_flags(numerator, BN_FLG_CONSTTIME);
2093 BN_set_flags(denominator, BN_FLG_CONSTTIME);
2095 /* Test that BN_div never gives negative zero in the quotient. */
2096 if (!TEST_true(BN_set_word(numerator, 1))
2097 || !TEST_true(BN_set_word(denominator, 2)))
2099 BN_set_negative(numerator, 1);
2100 if (!TEST_true(BN_div(a, b, numerator, denominator, ctx))
2101 || !TEST_BN_eq_zero(a)
2102 || !TEST_BN_ge_zero(a))
2105 /* Test that BN_div never gives negative zero in the remainder. */
2106 if (!TEST_true(BN_set_word(denominator, 1))
2107 || !TEST_true(BN_div(a, b, numerator, denominator, ctx))
2108 || !TEST_BN_eq_zero(b)
2109 || !TEST_BN_ge_zero(b))
2112 BN_free(denominator);
2113 numerator = denominator = NULL;
2116 /* Test that BN_set_negative will not produce a negative zero. */
2118 BN_set_negative(a, 1);
2119 if (BN_is_negative(a))
2129 BN_free(denominator);
2133 static int test_badmod(void)
2135 BIGNUM *a = NULL, *b = NULL, *zero = NULL;
2136 BN_MONT_CTX *mont = NULL;
2139 if (!TEST_ptr(a = BN_new())
2140 || !TEST_ptr(b = BN_new())
2141 || !TEST_ptr(zero = BN_new())
2142 || !TEST_ptr(mont = BN_MONT_CTX_new()))
2146 if (!TEST_false(BN_div(a, b, BN_value_one(), zero, ctx)))
2150 if (!TEST_false(BN_mod_mul(a, BN_value_one(), BN_value_one(), zero, ctx)))
2154 if (!TEST_false(BN_mod_exp(a, BN_value_one(), BN_value_one(), zero, ctx)))
2158 if (!TEST_false(BN_mod_exp_mont(a, BN_value_one(), BN_value_one(),
2163 if (!TEST_false(BN_mod_exp_mont_consttime(a, BN_value_one(), BN_value_one(),
2168 if (!TEST_false(BN_MONT_CTX_set(mont, zero, ctx)))
2172 /* Some operations also may not be used with an even modulus. */
2173 if (!TEST_true(BN_set_word(b, 16)))
2176 if (!TEST_false(BN_MONT_CTX_set(mont, b, ctx)))
2180 if (!TEST_false(BN_mod_exp_mont(a, BN_value_one(), BN_value_one(),
2185 if (!TEST_false(BN_mod_exp_mont_consttime(a, BN_value_one(), BN_value_one(),
2195 BN_MONT_CTX_free(mont);
2199 static int test_expmodzero(void)
2201 BIGNUM *a = NULL, *r = NULL, *zero = NULL;
2204 if (!TEST_ptr(zero = BN_new())
2205 || !TEST_ptr(a = BN_new())
2206 || !TEST_ptr(r = BN_new()))
2210 if (!TEST_true(BN_mod_exp(r, a, zero, BN_value_one(), NULL))
2211 || !TEST_BN_eq_zero(r)
2212 || !TEST_true(BN_mod_exp_mont(r, a, zero, BN_value_one(),
2214 || !TEST_BN_eq_zero(r)
2215 || !TEST_true(BN_mod_exp_mont_consttime(r, a, zero,
2218 || !TEST_BN_eq_zero(r)
2219 || !TEST_true(BN_mod_exp_mont_word(r, 42, zero,
2220 BN_value_one(), NULL, NULL))
2221 || !TEST_BN_eq_zero(r))
2232 static int test_expmodone(void)
2235 BIGNUM *r = BN_new();
2236 BIGNUM *a = BN_new();
2237 BIGNUM *p = BN_new();
2238 BIGNUM *m = BN_new();
2245 || !TEST_true(BN_set_word(a, 1))
2246 || !TEST_true(BN_set_word(p, 0))
2247 || !TEST_true(BN_set_word(m, 1)))
2250 /* Calculate r = 1 ^ 0 mod 1, and check the result is always 0 */
2251 for (i = 0; i < 2; i++) {
2252 if (!TEST_true(BN_mod_exp(r, a, p, m, NULL))
2253 || !TEST_BN_eq_zero(r)
2254 || !TEST_true(BN_mod_exp_mont(r, a, p, m, NULL, NULL))
2255 || !TEST_BN_eq_zero(r)
2256 || !TEST_true(BN_mod_exp_mont_consttime(r, a, p, m, NULL, NULL))
2257 || !TEST_BN_eq_zero(r)
2258 || !TEST_true(BN_mod_exp_mont_word(r, 1, p, m, NULL, NULL))
2259 || !TEST_BN_eq_zero(r)
2260 || !TEST_true(BN_mod_exp_simple(r, a, p, m, NULL))
2261 || !TEST_BN_eq_zero(r)
2262 || !TEST_true(BN_mod_exp_recp(r, a, p, m, NULL))
2263 || !TEST_BN_eq_zero(r))
2265 /* Repeat for r = 1 ^ 0 mod -1 */
2267 BN_set_negative(m, 1);
2279 static int test_smallprime(int kBits)
2284 if (!TEST_ptr(r = BN_new()))
2288 if (!TEST_false(BN_generate_prime_ex(r, kBits, 0,
2292 if (!TEST_true(BN_generate_prime_ex(r, kBits, 0,
2294 || !TEST_int_eq(BN_num_bits(r), kBits))
2304 static int test_smallsafeprime(int kBits)
2309 if (!TEST_ptr(r = BN_new()))
2312 if (kBits <= 5 && kBits != 3) {
2313 if (!TEST_false(BN_generate_prime_ex(r, kBits, 1,
2317 if (!TEST_true(BN_generate_prime_ex(r, kBits, 1,
2319 || !TEST_int_eq(BN_num_bits(r), kBits))
2329 static int primes[] = { 2, 3, 5, 7, 17863 };
2331 static int test_is_prime(int i)
2337 if (!TEST_ptr(r = BN_new()))
2340 for (trial = 0; trial <= 1; ++trial) {
2341 if (!TEST_true(BN_set_word(r, primes[i]))
2342 || !TEST_int_eq(BN_check_prime(r, ctx, NULL),
2353 static int not_primes[] = { -1, 0, 1, 4 };
2355 static int test_not_prime(int i)
2361 if (!TEST_ptr(r = BN_new()))
2364 for (trial = 0; trial <= 1; ++trial) {
2365 if (!TEST_true(BN_set_word(r, not_primes[i]))
2366 || !TEST_false(BN_check_prime(r, ctx, NULL)))
2376 static int test_ctx_set_ct_flag(BN_CTX *c)
2383 for (i = 0; i < OSSL_NELEM(b); i++) {
2384 if (!TEST_ptr(b[i] = BN_CTX_get(c)))
2387 BN_set_flags(b[i], BN_FLG_CONSTTIME);
2396 static int test_ctx_check_ct_flag(BN_CTX *c)
2403 for (i = 0; i < OSSL_NELEM(b); i++) {
2404 if (!TEST_ptr(b[i] = BN_CTX_get(c)))
2406 if (!TEST_false(BN_get_flags(b[i], BN_FLG_CONSTTIME)))
2416 static int test_ctx_consttime_flag(void)
2419 * The constant-time flag should not "leak" among BN_CTX frames:
2421 * - test_ctx_set_ct_flag() starts a frame in the given BN_CTX and
2422 * sets the BN_FLG_CONSTTIME flag on some of the BIGNUMs obtained
2423 * from the frame before ending it.
2424 * - test_ctx_check_ct_flag() then starts a new frame and gets a
2425 * number of BIGNUMs from it. In absence of leaks, none of the
2426 * BIGNUMs in the new frame should have BN_FLG_CONSTTIME set.
2428 * In actual BN_CTX usage inside libcrypto the leak could happen at
2429 * any depth level in the BN_CTX stack, with varying results
2430 * depending on the patterns of sibling trees of nested function
2431 * calls sharing the same BN_CTX object, and the effect of
2432 * unintended BN_FLG_CONSTTIME on the called BN_* functions.
2434 * This simple unit test abstracts away this complexity and verifies
2435 * that the leak does not happen between two sibling functions
2436 * sharing the same BN_CTX object at the same level of nesting.
2439 BN_CTX *nctx = NULL;
2440 BN_CTX *sctx = NULL;
2444 if (!TEST_ptr(nctx = BN_CTX_new())
2445 || !TEST_ptr(sctx = BN_CTX_secure_new()))
2448 for (i = 0; i < 2; i++) {
2449 BN_CTX *c = i == 0 ? nctx : sctx;
2450 if (!TEST_true(test_ctx_set_ct_flag(c))
2451 || !TEST_true(test_ctx_check_ct_flag(c)))
2462 static int test_gcd_prime(void)
2464 BIGNUM *a = NULL, *b = NULL, *gcd = NULL;
2467 if (!TEST_ptr(a = BN_new())
2468 || !TEST_ptr(b = BN_new())
2469 || !TEST_ptr(gcd = BN_new()))
2472 if (!TEST_true(BN_generate_prime_ex(a, 1024, 0, NULL, NULL, NULL)))
2474 for (i = 0; i < NUM0; i++) {
2475 if (!TEST_true(BN_generate_prime_ex(b, 1024, 0,
2477 || !TEST_true(BN_gcd(gcd, a, b, ctx))
2478 || !TEST_true(BN_is_one(gcd)))
2490 typedef struct mod_exp_test_st
2498 static const MOD_EXP_TEST ModExpTests[] = {
2499 /* original test vectors for rsaz_512_sqr bug, by OSS-Fuzz */
2501 "1166180238001879113042182292626169621106255558914000595999312084"
2502 "4627946820899490684928760491249738643524880720584249698100907201"
2503 "002086675047927600340800371",
2504 "8000000000000000000000000000000000000000000000000000000000000000"
2505 "0000000000000000000000000000000000000000000000000000000000000000"
2507 "1340780792684523720980737645613191762604395855615117867483316354"
2508 "3294276330515137663421134775482798690129946803802212663956180562"
2509 "088664022929883876655300863",
2510 "8243904058268085430037326628480645845409758077568738532059032482"
2511 "8294114415890603594730158120426756266457928475330450251339773498"
2512 "26758407619521544102068438"
2515 "4974270041410803822078866696159586946995877618987010219312844726"
2516 "0284386121835740784990869050050504348861513337232530490826340663"
2517 "197278031692737429054",
2518 "4974270041410803822078866696159586946995877428188754995041148539"
2519 "1663243362592271353668158565195557417149981094324650322556843202"
2520 "946445882670777892608",
2521 "1340780716511420227215592830971452482815377482627251725537099028"
2522 "4429769497230131760206012644403029349547320953206103351725462999"
2523 "947509743623340557059752191",
2524 "5296244594780707015616522701706118082963369547253192207884519362"
2525 "1767869984947542695665420219028522815539559194793619684334900442"
2526 "49304558011362360473525933"
2528 /* test vectors for rsaz_512_srq bug, with rcx/rbx=1 */
2529 { /* between first and second iteration */
2530 "5148719036160389201525610950887605325980251964889646556085286545"
2531 "3931548809178823413169359635978762036512397113080988070677858033"
2532 "36463909753993540214027190",
2533 "6703903964971298549787012499102923063739682910296196688861780721"
2534 "8608820150367734884009371490834517138450159290932430254268769414"
2535 "05973284973216824503042158",
2536 "6703903964971298549787012499102923063739682910296196688861780721"
2537 "8608820150367734884009371490834517138450159290932430254268769414"
2538 "05973284973216824503042159",
2541 { /* between second and third iteration */
2542 "8908340854353752577419678771330460827942371434853054158622636544"
2543 "8151360109722890949471912566649465436296659601091730745087014189"
2544 "2672764191218875181826063",
2545 "6703903964971298549787012499102923063739682910296196688861780721"
2546 "8608820150367734884009371490834517138450159290932430254268769414"
2547 "05973284973216824503042158",
2548 "6703903964971298549787012499102923063739682910296196688861780721"
2549 "8608820150367734884009371490834517138450159290932430254268769414"
2550 "05973284973216824503042159",
2553 { /* between third and fourth iteration */
2554 "3427446396505596330634350984901719674479522569002785244080234738"
2555 "4288743635435746136297299366444548736533053717416735379073185344"
2556 "26985272974404612945608761",
2557 "6703903964971298549787012499102923063739682910296196688861780721"
2558 "8608820150367734884009371490834517138450159290932430254268769414"
2559 "05973284973216824503042158",
2560 "6703903964971298549787012499102923063739682910296196688861780721"
2561 "8608820150367734884009371490834517138450159290932430254268769414"
2562 "05973284973216824503042159",
2565 { /* between fourth and fifth iteration */
2566 "3472743044917564564078857826111874560045331237315597383869652985"
2567 "6919870028890895988478351133601517365908445058405433832718206902"
2568 "4088133164805266956353542",
2569 "6703903964971298549787012499102923063739682910296196688861780721"
2570 "8608820150367734884009371490834517138450159290932430254268769414"
2571 "05973284973216824503042158",
2572 "6703903964971298549787012499102923063739682910296196688861780721"
2573 "8608820150367734884009371490834517138450159290932430254268769414"
2574 "05973284973216824503042159",
2577 { /* between fifth and sixth iteration */
2578 "3608632990153469264412378349742339216742409743898601587274768025"
2579 "0110772032985643555192767717344946174122842255204082586753499651"
2580 "14483434992887431333675068",
2581 "6703903964971298549787012499102923063739682910296196688861780721"
2582 "8608820150367734884009371490834517138450159290932430254268769414"
2583 "05973284973216824503042158",
2584 "6703903964971298549787012499102923063739682910296196688861780721"
2585 "8608820150367734884009371490834517138450159290932430254268769414"
2586 "05973284973216824503042159",
2589 { /* between sixth and seventh iteration */
2590 "8455374370234070242910508226941981520235709767260723212165264877"
2591 "8689064388017521524568434328264431772644802567028663962962025746"
2592 "9283458217850119569539086",
2593 "6703903964971298549787012499102923063739682910296196688861780721"
2594 "8608820150367734884009371490834517138450159290932430254268769414"
2595 "05973284973216824503042158",
2596 "6703903964971298549787012499102923063739682910296196688861780721"
2597 "8608820150367734884009371490834517138450159290932430254268769414"
2598 "05973284973216824503042159",
2601 { /* between seventh and eighth iteration */
2602 "5155371529688532178421209781159131443543419764974688878527112131"
2603 "7446518205609427412336183157918981038066636807317733319323257603"
2604 "04416292040754017461076359",
2605 "1005585594745694782468051874865438459560952436544429503329267108"
2606 "2791323022555160232601405723625177570767523893639864538140315412"
2607 "108959927459825236754563832",
2608 "1005585594745694782468051874865438459560952436544429503329267108"
2609 "2791323022555160232601405723625177570767523893639864538140315412"
2610 "108959927459825236754563833",
2613 /* test vectors for rsaz_512_srq bug, with rcx/rbx=2 */
2614 { /* between first and second iteration */
2615 "3155666506033786929967309937640790361084670559125912405342594979"
2616 "4345142818528956285490897841406338022378565972533508820577760065"
2617 "58494345853302083699912572",
2618 "6703903964971298549787012499102923063739682910296196688861780721"
2619 "8608820150367734884009371490834517138450159290932430254268769414"
2620 "05973284973216824503042158",
2621 "6703903964971298549787012499102923063739682910296196688861780721"
2622 "8608820150367734884009371490834517138450159290932430254268769414"
2623 "05973284973216824503042159",
2626 { /* between second and third iteration */
2627 "3789819583801342198190405714582958759005991915505282362397087750"
2628 "4213544724644823098843135685133927198668818185338794377239590049"
2629 "41019388529192775771488319",
2630 "6703903964971298549787012499102923063739682910296196688861780721"
2631 "8608820150367734884009371490834517138450159290932430254268769414"
2632 "05973284973216824503042158",
2633 "6703903964971298549787012499102923063739682910296196688861780721"
2634 "8608820150367734884009371490834517138450159290932430254268769414"
2635 "05973284973216824503042159",
2638 { /* between third and forth iteration */
2639 "4695752552040706867080542538786056470322165281761525158189220280"
2640 "4025547447667484759200742764246905647644662050122968912279199065"
2641 "48065034299166336940507214",
2642 "6703903964971298549787012499102923063739682910296196688861780721"
2643 "8608820150367734884009371490834517138450159290932430254268769414"
2644 "05973284973216824503042158",
2645 "6703903964971298549787012499102923063739682910296196688861780721"
2646 "8608820150367734884009371490834517138450159290932430254268769414"
2647 "05973284973216824503042159",
2650 { /* between forth and fifth iteration */
2651 "2159140240970485794188159431017382878636879856244045329971239574"
2652 "8919691133560661162828034323196457386059819832804593989740268964"
2653 "74502911811812651475927076",
2654 "6703903964971298549787012499102923063739682910296196688861780721"
2655 "8608820150367734884009371490834517138450159290932430254268769414"
2656 "05973284973216824503042158",
2657 "6703903964971298549787012499102923063739682910296196688861780721"
2658 "8608820150367734884009371490834517138450159290932430254268769414"
2659 "05973284973216824503042159",
2662 { /* between fifth and sixth iteration */
2663 "5239312332984325668414624633307915097111691815000872662334695514"
2664 "5436533521392362443557163429336808208137221322444780490437871903"
2665 "99972784701334569424519255",
2666 "6703903964971298549787012499102923063739682910296196688861780721"
2667 "8608820150367734884009371490834517138450159290932430254268769414"
2668 "05973284973216824503042158",
2669 "6703903964971298549787012499102923063739682910296196688861780721"
2670 "8608820150367734884009371490834517138450159290932430254268769414"
2671 "05973284973216824503042159",
2674 { /* between sixth and seventh iteration */
2675 "1977953647322612860406858017869125467496941904523063466791308891"
2676 "1172796739058531929470539758361774569875505293428856181093904091"
2677 "33788264851714311303725089",
2678 "6703903964971298549787012499102923063739682910296196688861780721"
2679 "8608820150367734884009371490834517138450159290932430254268769414"
2680 "05973284973216824503042158",
2681 "6703903964971298549787012499102923063739682910296196688861780721"
2682 "8608820150367734884009371490834517138450159290932430254268769414"
2683 "05973284973216824503042159",
2686 { /* between seventh and eighth iteration */
2687 "6456987954117763835533395796948878140715006860263624787492985786"
2688 "8514630216966738305923915688821526449499763719943997120302368211"
2689 "04813318117996225041943964",
2690 "1340780792994259709957402499820584612747936582059239337772356144"
2691 "3721764030073546976801874298166903427690031858186486050853753882"
2692 "811946551499689575296532556",
2693 "1340780792994259709957402499820584612747936582059239337772356144"
2694 "3721764030073546976801874298166903427690031858186486050853753882"
2695 "811946551499689575296532557",
2700 static int test_mod_exp(int i)
2702 const MOD_EXP_TEST *test = &ModExpTests[i];
2704 BIGNUM* result = NULL;
2705 BIGNUM *base = NULL, *exponent = NULL, *modulo = NULL;
2708 if (!TEST_ptr(result = BN_new())
2709 || !TEST_true(BN_dec2bn(&base, test->base))
2710 || !TEST_true(BN_dec2bn(&exponent, test->exp))
2711 || !TEST_true(BN_dec2bn(&modulo, test->mod)))
2714 if (!TEST_int_eq(BN_mod_exp(result, base, exponent, modulo, ctx), 1))
2717 if (!TEST_ptr(s = BN_bn2dec(result)))
2720 if (!TEST_mem_eq(s, strlen(s), test->res, strlen(test->res)))
2734 static int test_mod_exp_consttime(int i)
2736 const MOD_EXP_TEST *test = &ModExpTests[i];
2738 BIGNUM* result = NULL;
2739 BIGNUM *base = NULL, *exponent = NULL, *modulo = NULL;
2742 if (!TEST_ptr(result = BN_new())
2743 || !TEST_true(BN_dec2bn(&base, test->base))
2744 || !TEST_true(BN_dec2bn(&exponent, test->exp))
2745 || !TEST_true(BN_dec2bn(&modulo, test->mod)))
2748 BN_set_flags(base, BN_FLG_CONSTTIME);
2749 BN_set_flags(exponent, BN_FLG_CONSTTIME);
2750 BN_set_flags(modulo, BN_FLG_CONSTTIME);
2752 if (!TEST_int_eq(BN_mod_exp(result, base, exponent, modulo, ctx), 1))
2755 if (!TEST_ptr(s = BN_bn2dec(result)))
2758 if (!TEST_mem_eq(s, strlen(s), test->res, strlen(test->res)))
2772 static int file_test_run(STANZA *s)
2774 static const FILETEST filetests[] = {
2776 {"LShift1", file_lshift1},
2777 {"LShift", file_lshift},
2778 {"RShift", file_rshift},
2779 {"Square", file_square},
2780 {"Product", file_product},
2781 {"Quotient", file_quotient},
2782 {"ModMul", file_modmul},
2783 {"ModExp", file_modexp},
2785 {"ModSqrt", file_modsqrt},
2788 int numtests = OSSL_NELEM(filetests);
2789 const FILETEST *tp = filetests;
2791 for ( ; --numtests >= 0; tp++) {
2792 if (findattr(s, tp->name) != NULL) {
2794 TEST_info("%s:%d: Failed %s test",
2795 s->test_file, s->start, tp->name);
2801 TEST_info("%s:%d: Unknown test", s->test_file, s->start);
2805 static int run_file_tests(int i)
2808 char *testfile = test_get_argument(i);
2811 if (!TEST_ptr(s = OPENSSL_zalloc(sizeof(*s))))
2813 if (!test_start_file(s, testfile)) {
2818 /* Read test file. */
2819 while (!BIO_eof(s->fp) && test_readstanza(s)) {
2820 if (s->numpairs == 0)
2822 if (!file_test_run(s))
2825 test_clearstanza(s);
2834 typedef enum OPTION_choice {
2837 OPT_STOCHASTIC_TESTS,
2841 const OPTIONS *test_get_options(void)
2843 static const OPTIONS test_options[] = {
2844 OPT_TEST_OPTIONS_WITH_EXTRA_USAGE("[file...]\n"),
2845 { "stochastic", OPT_STOCHASTIC_TESTS, '-', "Run stochastic tests" },
2846 { OPT_HELP_STR, 1, '-',
2847 "file\tFile to run tests on. Normal tests are not run\n" },
2850 return test_options;
2853 int setup_tests(void)
2856 int n, stochastic = 0;
2858 while ((o = opt_next()) != OPT_EOF) {
2860 case OPT_STOCHASTIC_TESTS:
2863 case OPT_TEST_CASES:
2870 n = test_get_argument_count();
2872 if (!TEST_ptr(ctx = BN_CTX_new()))
2877 ADD_TEST(test_div_recip);
2879 ADD_TEST(test_modexp_mont5);
2880 ADD_TEST(test_kronecker);
2881 ADD_TEST(test_rand);
2882 ADD_TEST(test_bn2padded);
2883 ADD_TEST(test_dec2bn);
2884 ADD_TEST(test_hex2bn);
2885 ADD_TEST(test_asc2bn);
2886 ADD_ALL_TESTS(test_mpi, (int)OSSL_NELEM(kMPITests));
2887 ADD_TEST(test_negzero);
2888 ADD_TEST(test_badmod);
2889 ADD_TEST(test_expmodzero);
2890 ADD_TEST(test_expmodone);
2891 ADD_ALL_TESTS(test_smallprime, 16);
2892 ADD_ALL_TESTS(test_smallsafeprime, 16);
2893 ADD_TEST(test_swap);
2894 ADD_TEST(test_ctx_consttime_flag);
2895 #ifndef OPENSSL_NO_EC2M
2896 ADD_TEST(test_gf2m_add);
2897 ADD_TEST(test_gf2m_mod);
2898 ADD_TEST(test_gf2m_mul);
2899 ADD_TEST(test_gf2m_sqr);
2900 ADD_TEST(test_gf2m_modinv);
2901 ADD_TEST(test_gf2m_moddiv);
2902 ADD_TEST(test_gf2m_modexp);
2903 ADD_TEST(test_gf2m_modsqrt);
2904 ADD_TEST(test_gf2m_modsolvequad);
2906 ADD_ALL_TESTS(test_is_prime, (int)OSSL_NELEM(primes));
2907 ADD_ALL_TESTS(test_not_prime, (int)OSSL_NELEM(not_primes));
2908 ADD_TEST(test_gcd_prime);
2909 ADD_ALL_TESTS(test_mod_exp, (int)OSSL_NELEM(ModExpTests));
2910 ADD_ALL_TESTS(test_mod_exp_consttime, (int)OSSL_NELEM(ModExpTests));
2912 ADD_TEST(test_rand_range);
2914 ADD_ALL_TESTS(run_file_tests, n);
2919 void cleanup_tests(void)