AbstractDeciding efficiently the emptiness of a real algebraic set defined by a single equation is a fundamental problem of computational real algebraic geometry. We propose an algorithm for this test. We find, when the algebraic set is non empty, at least one point on each semi-algebraically connected component. The problem is reduced to deciding the existence of real critical points of the distance function and computing them
AbstractWe give new positive and negative results, some conditional, on speeding up computational al...
Several typos fixed in Sections 4 and 5. There is an error in Section 5 and thus the complexity resu...
Major revision, accepted for publication to Journal of the ACMInternational audienceA roadmap for a ...
AbstractDeciding efficiently the emptiness of a real algebraic set defined by a single equation is a...
Article dans revue scientifique avec comité de lecture.International audienceDeciding efficiently th...
Article dans revue scientifique avec comité de lecture. internationale.International audienceComputi...
Colloque sur invitation. internationale.International audienceDeciding if a semi-algebraic set is em...
International audienceLet $f$ be a polynomial in $Q[X_{1},…,X_{n}]$ of degree $D$. We focus on testi...
AbstractWe consider a family ofspolynomials, P = {P1, …,Ps}, inkvariables with coefficients in a rea...
In previous work we designed an efficient procedure that finds an algebraic sample point for each co...
Let $\mathbb{R}$ be the field of real numbers. We consider the problem of computing the real isolate...
International audienceLet $R$ be a real closed field. We consider basic semi-algebraic sets defined ...
International audienceCritical point methods are at the core of the interplay between polynomial opt...
AbstractWe address two basic questions for real algebraic curves. The first one is how to decide whe...
Given a real algebraic curve, embedded in projective space, we study the computational problem of de...
AbstractWe give new positive and negative results, some conditional, on speeding up computational al...
Several typos fixed in Sections 4 and 5. There is an error in Section 5 and thus the complexity resu...
Major revision, accepted for publication to Journal of the ACMInternational audienceA roadmap for a ...
AbstractDeciding efficiently the emptiness of a real algebraic set defined by a single equation is a...
Article dans revue scientifique avec comité de lecture.International audienceDeciding efficiently th...
Article dans revue scientifique avec comité de lecture. internationale.International audienceComputi...
Colloque sur invitation. internationale.International audienceDeciding if a semi-algebraic set is em...
International audienceLet $f$ be a polynomial in $Q[X_{1},…,X_{n}]$ of degree $D$. We focus on testi...
AbstractWe consider a family ofspolynomials, P = {P1, …,Ps}, inkvariables with coefficients in a rea...
In previous work we designed an efficient procedure that finds an algebraic sample point for each co...
Let $\mathbb{R}$ be the field of real numbers. We consider the problem of computing the real isolate...
International audienceLet $R$ be a real closed field. We consider basic semi-algebraic sets defined ...
International audienceCritical point methods are at the core of the interplay between polynomial opt...
AbstractWe address two basic questions for real algebraic curves. The first one is how to decide whe...
Given a real algebraic curve, embedded in projective space, we study the computational problem of de...
AbstractWe give new positive and negative results, some conditional, on speeding up computational al...
Several typos fixed in Sections 4 and 5. There is an error in Section 5 and thus the complexity resu...
Major revision, accepted for publication to Journal of the ACMInternational audienceA roadmap for a ...