International audienceSingular zeros of systems of polynomial equations constitute a bottleneck when it comes to computing, since several methods relying on the regularity of the Jacobian matrix of the system do not apply when the latter has a non-trivial kernel. Therefore they require special treatment. The algebraic information regarding an isolated singularity can be captured by a finite, local basis of differentials expressing the multiplicity structure of the point. In the present article, we review some available algebraic techniques for extracting this information from a polynomial ideal. The algorithms for extracting the, so called, dual basis of the singularity are based on matrix-kernel computations, which can be carried out numer...
AbstractŠiljak's method provides a globally convergent algorithm for inclusion of polynomial zeros. ...
We present a modification of Newton's method to restore quadratic convergence for isolated sing...
AbstractLet f1,…,fk be k multivariate polynomials which have a finite number of common zeros in the ...
International audienceWe develop a new symbolic-numeric algorithm for the certification of singular ...
International audienceThis paper presents two new constructions related to singular solutions of pol...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
AbstractWe present a modification of Newton's method to restore quadratic convergence for isolated s...
AbstractWe present a method based on symbolic–numeric reduction to geometric involutive form to comp...
AbstractA method to generate accurate approximations to the singular solutions of a system of (compl...
International audienceIsolated singularities typically occur at self-intersection points of planar a...
AbstractWhen the Jacobian of a computed numerical solution of a polynomial system in Cn allows very ...
AbstractMany problems give rise to polynomial systems. These systems often have several parameters a...
AbstractThis paper presents a new algorithm that computes the local algebras of the roots of a zero-...
If a real world problem is modelled with a system of polynomial equations, the coefficients are in g...
A zero-dimensional polynomial ideal may have a lot of complex zeros. But sometimes, only some of the...
AbstractŠiljak's method provides a globally convergent algorithm for inclusion of polynomial zeros. ...
We present a modification of Newton's method to restore quadratic convergence for isolated sing...
AbstractLet f1,…,fk be k multivariate polynomials which have a finite number of common zeros in the ...
International audienceWe develop a new symbolic-numeric algorithm for the certification of singular ...
International audienceThis paper presents two new constructions related to singular solutions of pol...
We propose a simple and fast implimentation to find real zeros of polynomials of integercoefiicients...
AbstractWe present a modification of Newton's method to restore quadratic convergence for isolated s...
AbstractWe present a method based on symbolic–numeric reduction to geometric involutive form to comp...
AbstractA method to generate accurate approximations to the singular solutions of a system of (compl...
International audienceIsolated singularities typically occur at self-intersection points of planar a...
AbstractWhen the Jacobian of a computed numerical solution of a polynomial system in Cn allows very ...
AbstractMany problems give rise to polynomial systems. These systems often have several parameters a...
AbstractThis paper presents a new algorithm that computes the local algebras of the roots of a zero-...
If a real world problem is modelled with a system of polynomial equations, the coefficients are in g...
A zero-dimensional polynomial ideal may have a lot of complex zeros. But sometimes, only some of the...
AbstractŠiljak's method provides a globally convergent algorithm for inclusion of polynomial zeros. ...
We present a modification of Newton's method to restore quadratic convergence for isolated sing...
AbstractLet f1,…,fk be k multivariate polynomials which have a finite number of common zeros in the ...