Details:
Title  A family of weak keys in HFE and the corresponding practical keyrecovery.  Author(s)  Charles Bouillaguet, PierreAlain Fouque, Antoine Joux, Joana Treger  Type  Article in Journal  Abstract  The HFE (hidden field equations) cryptosystem is one of the most interesting publickey multivariate schemes. It has been proposed more than 10 years ago by Patarin and seems to withstand the attacks that break many other multivariate schemes, since only subexponential ones have been proposed. The public key is a system of quadratic equations in many variables. These equations are generated from the composition of the secret elements: two linear mappings and a polynomial of small degree over an extension field. In this paper we show that there exist weak keys in HFE when the coefficients of the internal polynomial are defined in the ground field. In this case, we reduce the secret key recovery problem to an instance of the Isomorphism of Polynomials (IP) Problem between the equations of the public key and themselves. Even though the hardness of recovering the secretkey of schemes such as SFLASH or relies on the hardness of the IP Problem, this is normally not the case for HFE, since the internal polynomial is kept secret. However, when a weak key is used, we show how to recover all the components of the secret key in practical time, given a solution to an instance of the IP Problem. This breaks in particular a variant of HFE proposed by Patarin to reduce the size of the public key and called the “subfield variant”. Recovering the secret key takes a few minutes.  Keywords  Cryptanalysis; multivariate cryptography; HFE; weak keys; Gröbner bases  ISSN  18622976; 18622984/e 
URL 
http://www.degruyter.com/view/j/jmc.2012.5.issue34/jmc.2011.012/jmc.2011.012.xml 
Language  English  Journal  J. Math. Cryptol.  Volume  5  Number  34  Pages  247275  Publisher  De Gruyter, Berlin  Year  2011  Edition  0  Translation 
No  Refereed 
No 
