Mercurial > dropbear
view libtommath/bn_mp_n_root_ex.c @ 1653:76189c9ffea2
External Public-Key Authentication API (#72)
* Implemented dynamic loading of an external plug-in shared library to delegate public key authentication
* Moved conditional compilation of the plugin infrastructure into the configure.ac script to be able to add -ldl to dropbear build only when the flag is enabled
* Added tags file to the ignore list
* Updated API to have the constructor to return function pointers in the pliugin instance. Added support for passing user name to the checkpubkey function. Added options to the session returned by the plugin and have dropbear to parse and process them
* Added -rdynamic to the linker flags when EPKA is enabled
* Changed the API to pass a previously created session to the checkPubKey function (created during preauth)
* Added documentation to the API
* Added parameter addrstring to plugin creation function
* Modified the API to retrieve the auth options. Instead of having them as field of the EPKASession struct, they are stored internally (plugin-dependent) in the plugin/session and retrieved through a pointer to a function (in the session)
* Changed option string to be a simple char * instead of unsigned char *
| author | fabriziobertocci <fabriziobertocci@gmail.com> |
|---|---|
| date | Wed, 15 May 2019 09:43:57 -0400 |
| parents | 8bba51a55704 |
| children | f52919ffd3b1 |
line wrap: on
line source
#include <tommath_private.h> #ifdef BN_MP_N_ROOT_EX_C /* LibTomMath, multiple-precision integer library -- Tom St Denis * * LibTomMath is a library that provides multiple-precision * integer arithmetic as well as number theoretic functionality. * * The library was designed directly after the MPI library by * Michael Fromberger but has been written from scratch with * additional optimizations in place. * * The library is free for all purposes without any express * guarantee it works. * * Tom St Denis, [email protected], http://libtom.org */ /* find the n'th root of an integer * * Result found such that (c)**b <= a and (c+1)**b > a * * This algorithm uses Newton's approximation * x[i+1] = x[i] - f(x[i])/f'(x[i]) * which will find the root in log(N) time where * each step involves a fair bit. This is not meant to * find huge roots [square and cube, etc]. */ int mp_n_root_ex (mp_int * a, mp_digit b, mp_int * c, int fast) { mp_int t1, t2, t3; int res, neg; /* input must be positive if b is even */ if (((b & 1) == 0) && (a->sign == MP_NEG)) { return MP_VAL; } if ((res = mp_init (&t1)) != MP_OKAY) { return res; } if ((res = mp_init (&t2)) != MP_OKAY) { goto LBL_T1; } if ((res = mp_init (&t3)) != MP_OKAY) { goto LBL_T2; } /* if a is negative fudge the sign but keep track */ neg = a->sign; a->sign = MP_ZPOS; /* t2 = 2 */ mp_set (&t2, 2); do { /* t1 = t2 */ if ((res = mp_copy (&t2, &t1)) != MP_OKAY) { goto LBL_T3; } /* t2 = t1 - ((t1**b - a) / (b * t1**(b-1))) */ /* t3 = t1**(b-1) */ if ((res = mp_expt_d_ex (&t1, b - 1, &t3, fast)) != MP_OKAY) { goto LBL_T3; } /* numerator */ /* t2 = t1**b */ if ((res = mp_mul (&t3, &t1, &t2)) != MP_OKAY) { goto LBL_T3; } /* t2 = t1**b - a */ if ((res = mp_sub (&t2, a, &t2)) != MP_OKAY) { goto LBL_T3; } /* denominator */ /* t3 = t1**(b-1) * b */ if ((res = mp_mul_d (&t3, b, &t3)) != MP_OKAY) { goto LBL_T3; } /* t3 = (t1**b - a)/(b * t1**(b-1)) */ if ((res = mp_div (&t2, &t3, &t3, NULL)) != MP_OKAY) { goto LBL_T3; } if ((res = mp_sub (&t1, &t3, &t2)) != MP_OKAY) { goto LBL_T3; } } while (mp_cmp (&t1, &t2) != MP_EQ); /* result can be off by a few so check */ for (;;) { if ((res = mp_expt_d_ex (&t1, b, &t2, fast)) != MP_OKAY) { goto LBL_T3; } if (mp_cmp (&t2, a) == MP_GT) { if ((res = mp_sub_d (&t1, 1, &t1)) != MP_OKAY) { goto LBL_T3; } } else { break; } } /* reset the sign of a first */ a->sign = neg; /* set the result */ mp_exch (&t1, c); /* set the sign of the result */ c->sign = neg; res = MP_OKAY; LBL_T3:mp_clear (&t3); LBL_T2:mp_clear (&t2); LBL_T1:mp_clear (&t1); return res; } #endif /* ref: $Format:%D$ */ /* git commit: $Format:%H$ */ /* commit time: $Format:%ai$ */