International audienceAssuming sufficiently many terms of a n-dimensional table defined over a field are given, we aim at guessing the linear recurrence relations with either constant or polynomial coefficients they satisfy. In many applications, the table terms come along with a structure: for instance, they may be zero outside of a cone, they may be built from a Gröbner basis of an ideal invariant under the action of a finite group. Thus, we show how to take advantage of this structure to both reduce the number of table queries and the number of operations in the base field to recover the ideal of relations of the table. In applications like in combinatorics, where all these zero terms make us guess many fake relations, this allows us to ...
Abstract. In this article we present two new algorithms to compute the Gröbner basis of an ideal th...
Title: Applications of Gröbner bases in cryptography Author: Aleš Fuchs Department: Department of Al...
AbstractThis paper is concerned with structural and algorithmic aspects of certain R-bases in polyno...
International audienceGiven several $n$-dimensional sequences, we first present an algorithmfor comp...
International audienceSparse polynomial interpolation, sparse linear system solving or modular ratio...
This habilitation thesis deals with polynomial system solving through Gröbner bases computations. I...
AbstractGröbner bases are distinguished sets of generators of ideals in polynomial rings. They can b...
AbstractWe prove that any orderOof any algebraic number field K is a reduction ring. Rather than sho...
International audienceSakata generalized the Berlekamp -- Massey algorithm to $n$ dimensions in~19...
AbstractWe construct an explicit minimal strong Gröbner basis of the ideal of vanishing polynomials ...
Abstract We demonstrate an average-case problem which is as hard as finding fl(n)-approximateshortes...
A basis for an ideal is such that every element in the ideal can be expressed as a linear combinatio...
Linear recurrent sequences are those whose elements are defined as linear combinations of preceding ...
Signature-based algorithms are efficient algorithms for computing Gröbner-Shirshov bases in commutat...
In this paper a new notion of reduction depending on an arbitrary non-empty set ORD of term ordering...
Abstract. In this article we present two new algorithms to compute the Gröbner basis of an ideal th...
Title: Applications of Gröbner bases in cryptography Author: Aleš Fuchs Department: Department of Al...
AbstractThis paper is concerned with structural and algorithmic aspects of certain R-bases in polyno...
International audienceGiven several $n$-dimensional sequences, we first present an algorithmfor comp...
International audienceSparse polynomial interpolation, sparse linear system solving or modular ratio...
This habilitation thesis deals with polynomial system solving through Gröbner bases computations. I...
AbstractGröbner bases are distinguished sets of generators of ideals in polynomial rings. They can b...
AbstractWe prove that any orderOof any algebraic number field K is a reduction ring. Rather than sho...
International audienceSakata generalized the Berlekamp -- Massey algorithm to $n$ dimensions in~19...
AbstractWe construct an explicit minimal strong Gröbner basis of the ideal of vanishing polynomials ...
Abstract We demonstrate an average-case problem which is as hard as finding fl(n)-approximateshortes...
A basis for an ideal is such that every element in the ideal can be expressed as a linear combinatio...
Linear recurrent sequences are those whose elements are defined as linear combinations of preceding ...
Signature-based algorithms are efficient algorithms for computing Gröbner-Shirshov bases in commutat...
In this paper a new notion of reduction depending on an arbitrary non-empty set ORD of term ordering...
Abstract. In this article we present two new algorithms to compute the Gröbner basis of an ideal th...
Title: Applications of Gröbner bases in cryptography Author: Aleš Fuchs Department: Department of Al...
AbstractThis paper is concerned with structural and algorithmic aspects of certain R-bases in polyno...