Title :
New Results on the Hardness of ElGamal and RSA Bits Based on Binary Expansions
Author :
Zheng-Qi Kang ; Ke-Wei Lv
Author_Institution :
State Key Lab. of Inf. Security, Inst. of Inf. Eng., Beijing, China
Abstract :
González Vasco et al. extend the area of application of algorithms for the hidden number problem in 2004. Using this extension and relations among the bits in and binary fraction expansion of x mod p/p, we present a probabilistic algorithm for some trapdoor functions to recover a hidden message when an imperfect oracle is given of predicting most significant bits in hidden message. We show that computing the most significant bit in message encrypted by ElGmal encryption function is as hard as computing the entire plaintext, and so is RSA.
Keywords :
public key cryptography; ElGamal bits; ElGamal encryption function; RSA bits; binary expansions; imperfect oracle; probabilistic algorithm; trapdoor functions; Monte Carlo methods; Polynomials; Prediction algorithms; Probabilistic logic; Public key; ElGamal; Hidden Number Problem; Most Significant Bit; RSA;
Conference_Titel :
Information Science and Control Engineering (ICISCE), 2015 2nd International Conference on
Conference_Location :
Shanghai
Print_ISBN :
978-1-4673-6849-0
DOI :
10.1109/ICISCE.2015.81
