Wiener's attack is a well-known polynomial-time attack on a RSA cryptosystem with small secret decryption exponent d, which works if d < n 0.25, where n = pq is the modulus of the cryptosystem. Namely, in that case, d is the denominator of some convergent p m /q m of the continued fraction expansion of e, and therefore d can be computed efficiently from the public key (n, e). There are several extensions of Wiener's attack that allow the RSA cryptosystem to be broken when d is a few bits longer than n 0.25. They all have the run-time complexity (at least) O(D 2), where d = Dn 0.25. Here we propose a new variant of Wiener's attack, which uses results on Diophantine approximations of the form |α - p/q| < c/q 2, and "meet-in-the-middle" variant for testing the candidates (of the form rq m+1 + sq m ) for the secret exponent. This decreases the run-time complexity of the attack to O(D log D) (with the space complexity O(D)). [PUBLICATION ABSTRACT]
展开▼