International audienceGröbner bases is one the most powerful tools in algorithmic non-linear algebra. Their computation is an intrinsically hard problem with a complexity at least single exponential in the number of variables. However, in most of the cases, the polynomial systems coming from applications have some kind of structure. For example , several problems in computer-aided design, robotics, vision, biology , kinematics, cryptography, and optimization involve sparse systems where the input polynomials have a few non-zero terms. Our approach to exploit sparsity is to embed the systems in a semigroup algebra and to compute Gröbner bases over this algebra. Up to now, the algorithms that follow this approach benefit from the sparsity onl...
This paper will explore the use and construction of Gröbner bases through Buchberger\u27s algorithm....
AbstractWe give a new class of algorithms for computing sparsest shifts of a given polynomial. Our a...
AbstractIt is known that the reduced Gröbner basis of general polynomial ideals can be computed in e...
International audienceOne of the biggest open problems in computational algebra is the design of eff...
Solving polynomial systems is one of the oldest and most important problems in computational mathema...
20 pages, Corollary 6.1 has been correctedInternational audienceToric (or sparse) elimination theory...
International audienceThis paper introduces a new efficient algorithm for computing Gröbner bases. T...
This paper addresses the problem of efficient construction of monomial bases for the coordinate ring...
AbstractThis paper introduces a new efficient algorithm for computing Gröbner bases. To avoid as muc...
Abstract. We consider sparse elimination theory in order to describe the Newton polytope of the spar...
Sparse elimination exploits the structure of a set of multivariate polynomials by measuring complexi...
This paper is concerned with linear algebra based methods for solving exactly polynomial systems thr...
AbstractSparse elimination exploits the structure of a multivariate polynomial by considering its Ne...
In this paper, we consider the problem of interpolating univariate polynomials over a field of chara...
International audienceLet I in K[x1,...,xn] be a 0-dimensional ideal of degree D where K is a field....
This paper will explore the use and construction of Gröbner bases through Buchberger\u27s algorithm....
AbstractWe give a new class of algorithms for computing sparsest shifts of a given polynomial. Our a...
AbstractIt is known that the reduced Gröbner basis of general polynomial ideals can be computed in e...
International audienceOne of the biggest open problems in computational algebra is the design of eff...
Solving polynomial systems is one of the oldest and most important problems in computational mathema...
20 pages, Corollary 6.1 has been correctedInternational audienceToric (or sparse) elimination theory...
International audienceThis paper introduces a new efficient algorithm for computing Gröbner bases. T...
This paper addresses the problem of efficient construction of monomial bases for the coordinate ring...
AbstractThis paper introduces a new efficient algorithm for computing Gröbner bases. To avoid as muc...
Abstract. We consider sparse elimination theory in order to describe the Newton polytope of the spar...
Sparse elimination exploits the structure of a set of multivariate polynomials by measuring complexi...
This paper is concerned with linear algebra based methods for solving exactly polynomial systems thr...
AbstractSparse elimination exploits the structure of a multivariate polynomial by considering its Ne...
In this paper, we consider the problem of interpolating univariate polynomials over a field of chara...
International audienceLet I in K[x1,...,xn] be a 0-dimensional ideal of degree D where K is a field....
This paper will explore the use and construction of Gröbner bases through Buchberger\u27s algorithm....
AbstractWe give a new class of algorithms for computing sparsest shifts of a given polynomial. Our a...
AbstractIt is known that the reduced Gröbner basis of general polynomial ideals can be computed in e...