We consider first the zero-nonzero determination problem, which consists in determining the list of zero-nonzero conditions realized by a finite list of polynomials on a finite set Z ⊂ Ck with C an algebraic closed field. We describe an algorithm to solve the zero-nonzero determination problem and we perform its bit complexity analysis. This algorithm, which is in many ways an adaptation of the methods used to solve the more classical sign determination problem, presents also new ideas which can be used to improve sign determination. Then, we consider the real-nonreal sign determination problem, which deals with both the sign determination and the zero-nonzero determination problem. We describe an algorithm to solve the real-nonreal sign de...
International audienceThe pseudozero set of a system P of polynomials in n variables is the subset o...
AbstractAn improved algorithm, together with its implementation, is presented for the automatic comp...
In this paper we propose two algorithms based on branch and bound method and reduced interval tec...
International audienceWe consider first the zero-nonzero determination problem, which consists in de...
We give a specific method to solve with quadratic complexity the linear systems arising in known alg...
AbstractWe give a specific method to solve with quadratic complexity the linear systems arising in k...
In an ordered algebraic extension field of the rationals algorithms for sign determinations are stud...
Sign determination is a fundamental problem in algebraic as well as geometric computing. It is the c...
One of the problems in real algebraic geometry is root counting. Given a polynomial, we want to coun...
AbstractWe consider a family ofspolynomials, P = {P1, …,Ps}, inkvariables with coefficients in a rea...
Sign determination is a fundamental problem in algebraic as well as geometric computing. It is the c...
International audienceLet $f$ be a polynomial in $Q[X_{1},…,X_{n}]$ of degree $D$. We focus on testi...
AbstractThis paper is concerned with exact real solving of well-constrained, bivariate polynomial sy...
International audiencePseudozeros are useful to describe how perturbations of polynomial coefficient...
This paper describes a set of algorithms for isolating the real zeros of a univariate polynomial wit...
International audienceThe pseudozero set of a system P of polynomials in n variables is the subset o...
AbstractAn improved algorithm, together with its implementation, is presented for the automatic comp...
In this paper we propose two algorithms based on branch and bound method and reduced interval tec...
International audienceWe consider first the zero-nonzero determination problem, which consists in de...
We give a specific method to solve with quadratic complexity the linear systems arising in known alg...
AbstractWe give a specific method to solve with quadratic complexity the linear systems arising in k...
In an ordered algebraic extension field of the rationals algorithms for sign determinations are stud...
Sign determination is a fundamental problem in algebraic as well as geometric computing. It is the c...
One of the problems in real algebraic geometry is root counting. Given a polynomial, we want to coun...
AbstractWe consider a family ofspolynomials, P = {P1, …,Ps}, inkvariables with coefficients in a rea...
Sign determination is a fundamental problem in algebraic as well as geometric computing. It is the c...
International audienceLet $f$ be a polynomial in $Q[X_{1},…,X_{n}]$ of degree $D$. We focus on testi...
AbstractThis paper is concerned with exact real solving of well-constrained, bivariate polynomial sy...
International audiencePseudozeros are useful to describe how perturbations of polynomial coefficient...
This paper describes a set of algorithms for isolating the real zeros of a univariate polynomial wit...
International audienceThe pseudozero set of a system P of polynomials in n variables is the subset o...
AbstractAn improved algorithm, together with its implementation, is presented for the automatic comp...
In this paper we propose two algorithms based on branch and bound method and reduced interval tec...