AbstractSparse elimination exploits the structure of a multivariate polynomial by considering its Newton polytope instead of its total degree. We concentrate on polynomial systems that generate zero-dimensional ideals. A monomial basis for the coordinate ring is defined from a mixed subdivision of the Minkowski sum of the Newton polytopes. We offer a new simple proof relying on the construction of a sparse resultant matrix, which leads to the computation of a multiplication map and all common zeros. The size of the monomial basis equals the mixed volume and its computation is equivalent to computing the mixed volume, so the latter is a measure of intrinsic complexity. On the other hand, our algorithms have worst-case complexity proportional...
AbstractWe propose a new and efficient algorithm for computing the sparse resultant of a system of n...
New results relating the sparsity of nonhomogeneous polynomial systems and computation of their proj...
20 pages, Corollary 6.1 has been correctedInternational audienceToric (or sparse) elimination theory...
Sparse elimination exploits the structure of a multivariate polynomial by considering its Newton pol...
AbstractSparse elimination exploits the structure of a multivariate polynomial by considering its Ne...
This paper addresses the problem of efficient construction of monomial bases for the coordinate ring...
Resultants characterize the existence of roots of systems of multivariate nonlinear polynomial equat...
Abstract. We consider sparse elimination theory in order to describe the Newton polytope of the spar...
AbstractResultants characterize the existence of roots of systems of multivariate nonlinear polynomi...
Resultants characterize the existence of roots of systems of multivariate nonlinear polynomial equat...
International audienceIt has by now become a standard approach to use the theory of sparse (or toric...
International audienceGröbner bases is one the most powerful tools in algorithmic non-linear algebra...
The method of finding the solutions of a system of non-linear polynomial equations has received a lo...
The contribution of the thesis is threefold. The first Problem is computing the discriminant, when t...
Solving polynomial systems is one of the oldest and most important problems in computational mathema...
AbstractWe propose a new and efficient algorithm for computing the sparse resultant of a system of n...
New results relating the sparsity of nonhomogeneous polynomial systems and computation of their proj...
20 pages, Corollary 6.1 has been correctedInternational audienceToric (or sparse) elimination theory...
Sparse elimination exploits the structure of a multivariate polynomial by considering its Newton pol...
AbstractSparse elimination exploits the structure of a multivariate polynomial by considering its Ne...
This paper addresses the problem of efficient construction of monomial bases for the coordinate ring...
Resultants characterize the existence of roots of systems of multivariate nonlinear polynomial equat...
Abstract. We consider sparse elimination theory in order to describe the Newton polytope of the spar...
AbstractResultants characterize the existence of roots of systems of multivariate nonlinear polynomi...
Resultants characterize the existence of roots of systems of multivariate nonlinear polynomial equat...
International audienceIt has by now become a standard approach to use the theory of sparse (or toric...
International audienceGröbner bases is one the most powerful tools in algorithmic non-linear algebra...
The method of finding the solutions of a system of non-linear polynomial equations has received a lo...
The contribution of the thesis is threefold. The first Problem is computing the discriminant, when t...
Solving polynomial systems is one of the oldest and most important problems in computational mathema...
AbstractWe propose a new and efficient algorithm for computing the sparse resultant of a system of n...
New results relating the sparsity of nonhomogeneous polynomial systems and computation of their proj...
20 pages, Corollary 6.1 has been correctedInternational audienceToric (or sparse) elimination theory...