International audienceIt has by now become a standard approach to use the theory of sparse (or toric) elimination, based on the Newton polytope of a polynomial, in order to reveal and exploit the structure of algebraic systems. This talk surveys compact formulae, including older and recent results, in sparse elimination. We start with root bounds and juxtapose two recent formulae: a generating function of the m-Bézout bound and a closed-form expression for the mixed volume by means of a matrix permanent. For the sparse resultant, a bevy of results have established determinantal or rational formulae for a large class of systems, starting with Macaulay. The discriminant is closely related to the resultant but admits no compact formula except ...
Solving polynomial systems is one of the oldest and most important problems in computational mathema...
Polynomial algebra offers a standard approach to handle severalproblems in geometric modeling. A key...
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...
AbstractSparse elimination exploits the structure of a multivariate polynomial by considering its Ne...
Sparse elimination exploits the structure of a set of multivariate polynomials by measuring complexi...
AbstractResultants characterize the existence of roots of systems of multivariate nonlinear polynomi...
20 pages, Corollary 6.1 has been correctedInternational audienceToric (or sparse) elimination theory...
We present formulas for computing the resultant of sparse polyno- mials as a quotient of two determi...
Resultants characterize the existence of roots of systems of multivariate nonlinear polynomial equat...
The Canny-Emiris formula gives the sparse resultant as a ratio between the determinant of a Sylveste...
Certifying function nonnegativity is a ubiquitous problem in computational mathematics, with especia...
AbstractWe give the first exact determinantal formula for the resultant of an unmixed sparse system ...
The contribution of the thesis is threefold. The first Problem is computing the discriminant, when t...
We prove that the sparse resultant, redefined by D'Andrea and Sombra and by Esterov as a power of th...
Solving polynomial systems is one of the oldest and most important problems in computational mathema...
Polynomial algebra offers a standard approach to handle severalproblems in geometric modeling. A key...
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...
AbstractSparse elimination exploits the structure of a multivariate polynomial by considering its Ne...
Sparse elimination exploits the structure of a set of multivariate polynomials by measuring complexi...
AbstractResultants characterize the existence of roots of systems of multivariate nonlinear polynomi...
20 pages, Corollary 6.1 has been correctedInternational audienceToric (or sparse) elimination theory...
We present formulas for computing the resultant of sparse polyno- mials as a quotient of two determi...
Resultants characterize the existence of roots of systems of multivariate nonlinear polynomial equat...
The Canny-Emiris formula gives the sparse resultant as a ratio between the determinant of a Sylveste...
Certifying function nonnegativity is a ubiquitous problem in computational mathematics, with especia...
AbstractWe give the first exact determinantal formula for the resultant of an unmixed sparse system ...
The contribution of the thesis is threefold. The first Problem is computing the discriminant, when t...
We prove that the sparse resultant, redefined by D'Andrea and Sombra and by Esterov as a power of th...
Solving polynomial systems is one of the oldest and most important problems in computational mathema...
Polynomial algebra offers a standard approach to handle severalproblems in geometric modeling. A key...
Resultants characterize the existence of roots of systems of multivariate nonlinear polynomial equat...