International audienceWe formally treat cryptographic constructions based on the hardness of deciding ideal membership in multivariate polynomial rings. Of particular interest to us is a class of schemes known as "Polly Cracker." We start by formalising and studying the relation between the ideal membership problem and the problem of computing a Gröbner basis. We show both positive and negative results. On the negative side, we define a symmetric Polly Cracker encryption scheme and prove that this scheme only achieves bounded CPA security under the hardness of the ideal membership problem. Furthermore, we show that a large class of algebraic transformations cannot convert this scheme to a fully secure Polly Cracker-style scheme. On the posi...
Abstract. We propose a general framework to develop fully homomorphic encryption schemes (FHE) witho...
Several well-known public key encryption schemes, including those of Alekhnovich (FOCS 2003), Regev ...
Polynomial system solving is one of the oldest and most important problems incomputational mathemati...
International audienceWe initiate the formal treatment of cryptographic constructions (“Polly Cracke...
We present the noncommutative version of the Polly Cracker cryptosystem, which is more promising tha...
We investigate the use of multivariate polynomials in constructing a fully homomorphic encryption. I...
Title: Applications of Gröbner bases in cryptography Author: Aleš Fuchs Department: Department of Al...
Abstract: We first present a fully homomorphic encryption scheme over the integers, which modifies t...
The worst-case hardness of finding short vectors in ideals of cyclotomic number fields (Ideal-SVP) i...
Basing on Learning with errors over rings (RLWE) assumption, we provide a new multi-bit somewhat hom...
Multivariate algebra plays a central role in today's cryptography. The most popular public key cryp...
We shortly review the Polly Cracker family of cryptosystems. Apparently all the cryptosystems of t...
Lattice Polly Cracker, is a public key cryptosystem that uses Gröbner bases of lattices for the prep...
International audienceSeveral recent proposals of efficient public-key encryption are based on varia...
Since its proposal by Regev in 2005, the Learning With Errors (LWE) problem was used as the underlyi...
Abstract. We propose a general framework to develop fully homomorphic encryption schemes (FHE) witho...
Several well-known public key encryption schemes, including those of Alekhnovich (FOCS 2003), Regev ...
Polynomial system solving is one of the oldest and most important problems incomputational mathemati...
International audienceWe initiate the formal treatment of cryptographic constructions (“Polly Cracke...
We present the noncommutative version of the Polly Cracker cryptosystem, which is more promising tha...
We investigate the use of multivariate polynomials in constructing a fully homomorphic encryption. I...
Title: Applications of Gröbner bases in cryptography Author: Aleš Fuchs Department: Department of Al...
Abstract: We first present a fully homomorphic encryption scheme over the integers, which modifies t...
The worst-case hardness of finding short vectors in ideals of cyclotomic number fields (Ideal-SVP) i...
Basing on Learning with errors over rings (RLWE) assumption, we provide a new multi-bit somewhat hom...
Multivariate algebra plays a central role in today's cryptography. The most popular public key cryp...
We shortly review the Polly Cracker family of cryptosystems. Apparently all the cryptosystems of t...
Lattice Polly Cracker, is a public key cryptosystem that uses Gröbner bases of lattices for the prep...
International audienceSeveral recent proposals of efficient public-key encryption are based on varia...
Since its proposal by Regev in 2005, the Learning With Errors (LWE) problem was used as the underlyi...
Abstract. We propose a general framework to develop fully homomorphic encryption schemes (FHE) witho...
Several well-known public key encryption schemes, including those of Alekhnovich (FOCS 2003), Regev ...
Polynomial system solving is one of the oldest and most important problems incomputational mathemati...