X-Git-Url: https://git.distorted.org.uk/u/mdw/catacomb/blobdiff_plain/dfdacfdcd7e3376072506d6bdf69271a0e6bd2e0..01898d8eb947e922eb289589cd7b1f016e2ada06:/rsa-decrypt.c diff --git a/rsa-decrypt.c b/rsa-decrypt.c new file mode 100644 index 0000000..808987c --- /dev/null +++ b/rsa-decrypt.c @@ -0,0 +1,142 @@ +/* -*-c-*- + * + * $Id: rsa-decrypt.c,v 1.1 1999/12/22 15:50:45 mdw Exp $ + * + * RSA decryption + * + * (c) 1999 Straylight/Edgeware + */ + +/*----- Licensing notice --------------------------------------------------* + * + * This file is part of Catacomb. + * + * Catacomb is free software; you can redistribute it and/or modify + * it under the terms of the GNU Library General Public License as + * published by the Free Software Foundation; either version 2 of the + * License, or (at your option) any later version. + * + * Catacomb is distributed in the hope that it will be useful, + * but WITHOUT ANY WARRANTY; without even the implied warranty of + * MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the + * GNU Library General Public License for more details. + * + * You should have received a copy of the GNU Library General Public + * License along with Catacomb; if not, write to the Free + * Software Foundation, Inc., 59 Temple Place - Suite 330, Boston, + * MA 02111-1307, USA. + */ + +/*----- Revision history --------------------------------------------------* + * + * $Log: rsa-decrypt.c,v $ + * Revision 1.1 1999/12/22 15:50:45 mdw + * Initial RSA support. + * + */ + +/*----- Header files ------------------------------------------------------*/ + +#include "mp.h" +#include "mpmont.h" +#include "mprand.h" +#include "rsa.h" + +/*----- Main code ---------------------------------------------------------*/ + +/* --- @rsa_decrypt@ --- * + * + * Arguments: @rsa_param *rp@ = pointer to RSA parameters + * @mp *d@ = destination + * @mp *c@ = ciphertext message + * @grand *r@ = pointer to random number source for blinding + * + * Returns: Correctly decrypted message. + * + * Use: Performs RSA decryption, very carefully. + */ + +mp *rsa_decrypt(rsa_param *rp, mp *d, mp *c, grand *r) +{ + mp *ki = MP_NEW; + + /* --- If so desired, set up a blinding constant --- * + * + * Choose a constant %$k$% relatively prime to the modulus %$m$%. Compute + * %$c' = c k^e \bmod n$%, and %$k^{-1} \bmod n$%. + */ + + c = MP_COPY(c); + if (r) { + mp *k = MP_NEW, *g = MP_NEW; + mpmont mm; + + do { + k = mprand_range(k, rp->n, r, 0); + mp_gcd(&g, 0, &ki, rp->n, k); + } while (MP_CMP(g, !=, MP_ONE)); + mpmont_create(&mm, rp->n); + k = mpmont_expr(&mm, k, k, rp->e); + c = mpmont_mul(&mm, c, c, k); + mp_drop(k); + mp_drop(g); + } + + /* --- Do the actual modular exponentiation --- * + * + * Use a slightly hacked version of the Chinese Remainder Theorem stuff. + * + * Let %$q' = q^{-1} \bmod p$%. Then note that + * %$c^d \equiv q (q'(c_p^{d_p} - c_q^{d_q}) \bmod p) + c_q^{d_q} \pmod n$% + */ + + { + mpmont mm; + mp *cp = MP_NEW, *cq = MP_NEW; + + /* --- Work out the two halves of the result --- */ + + mp_div(0, &cp, c, rp->p); + mpmont_create(&mm, rp->p); + cp = mpmont_exp(&mm, cp, cp, rp->dp); + mpmont_destroy(&mm); + + mp_div(0, &cq, c, rp->q); + mpmont_create(&mm, rp->q); + cq = mpmont_exp(&mm, cq, cq, rp->dq); + mpmont_destroy(&mm); + + /* --- Combine the halves using the result above --- */ + + d = mp_sub(d, cp, cq); + if (cp->f & MP_NEG) + d = mp_add(d, d, rp->p); + d = mp_mul(d, d, rp->q_inv); + mp_div(0, &d, d, rp->p); + + d = mp_mul(d, d, rp->q); + d = mp_add(d, d, cq); + if (MP_CMP(d, >=, rp->n)) + d = mp_sub(d, d, rp->n); + + /* --- Tidy away temporary variables --- */ + + mp_drop(cp); + mp_drop(cq); + } + + /* --- Finally, possibly remove the blinding factor --- */ + + if (ki) { + d = mp_mul(d, d, ki); + mp_div(0, &d, d, rp->n); + mp_drop(ki); + } + + /* --- Done --- */ + + mp_drop(c); + return (d); +} + +/*----- That's all, folks -------------------------------------------------*/