AbstractWe consider a family ofspolynomials, P = {P1, …,Ps}, inkvariables with coefficients in a real closed fieldR, each of degree at mostd, and an algebraic varietyVof real dimensionk′ which is defined as the zero set of a polynomialQof degree at mostd. The number of semi-algebraically connected components of all non-empty sign conditions on P overVis bounded bysk′(O(d))k. In this paper we present a new algorithm to compute a set of points meeting every semi-algebraically connected component of each non-empty sign condition of P overV. Its complexity issk′ + 1dO(k). This interpolates a sequence of results between the Ben-Or–Kozen–Reif algorithm which is the casek′ = 0, in one variable, and the Basu–Pollack–Roy algorithm which is the casek...
Given a finite set X of points and a tolerance epsilon representing the maximum error on the coordin...
Abstract. In this paper we prove new bounds on the sum of the Betti numbers of closed semi-algebraic...
Let $\mathbb{K}$ be a field of characteristic zero and $\mathbb{K}[x_1, \dots, x_n]$ the correspondi...
AbstractWe consider a family ofspolynomials, P = {P1, …,Ps}, inkvariables with coefficients in a rea...
Given Q 2 R[X1 ; : : : ; Xk ] with deg(Q) d; we give an algorithm that outputs a semi-algebraic des...
International audienceLet $f$ be a polynomial in $Q[X_{1},…,X_{n}]$ of degree $D$. We focus on testi...
Colloque sur invitation. internationale.International audienceDeciding if a semi-algebraic set is em...
AbstractIn this paper an algorithm is described for the computation of the dimensions of all irreduc...
AbstractWe give a uniform method for the two problems of counting the connected and irreducible comp...
Abstract. We describe a characteristic-free algorithm for "reducing " an algebraic variety...
Abstract. Let X1,..., Xn be indeterminates over Q and let X: = (X1,..., Xn). Let F1,..., Fp be a reg...
Given a quadratic map Q : Kn → Kk defined over a computable subring D of a real closed field K, and ...
Abstract. Let f1; : : : ; fk be k multivariate polynomials which have a finite number of common zero...
Given a set Γ of low-degree k-dimensional varieties in R[superscript n], we prove that for any D ⩾ 1...
We consider first the zero-nonzero determination problem, which consists in determining the list of ...
Given a finite set X of points and a tolerance epsilon representing the maximum error on the coordin...
Abstract. In this paper we prove new bounds on the sum of the Betti numbers of closed semi-algebraic...
Let $\mathbb{K}$ be a field of characteristic zero and $\mathbb{K}[x_1, \dots, x_n]$ the correspondi...
AbstractWe consider a family ofspolynomials, P = {P1, …,Ps}, inkvariables with coefficients in a rea...
Given Q 2 R[X1 ; : : : ; Xk ] with deg(Q) d; we give an algorithm that outputs a semi-algebraic des...
International audienceLet $f$ be a polynomial in $Q[X_{1},…,X_{n}]$ of degree $D$. We focus on testi...
Colloque sur invitation. internationale.International audienceDeciding if a semi-algebraic set is em...
AbstractIn this paper an algorithm is described for the computation of the dimensions of all irreduc...
AbstractWe give a uniform method for the two problems of counting the connected and irreducible comp...
Abstract. We describe a characteristic-free algorithm for "reducing " an algebraic variety...
Abstract. Let X1,..., Xn be indeterminates over Q and let X: = (X1,..., Xn). Let F1,..., Fp be a reg...
Given a quadratic map Q : Kn → Kk defined over a computable subring D of a real closed field K, and ...
Abstract. Let f1; : : : ; fk be k multivariate polynomials which have a finite number of common zero...
Given a set Γ of low-degree k-dimensional varieties in R[superscript n], we prove that for any D ⩾ 1...
We consider first the zero-nonzero determination problem, which consists in determining the list of ...
Given a finite set X of points and a tolerance epsilon representing the maximum error on the coordin...
Abstract. In this paper we prove new bounds on the sum of the Betti numbers of closed semi-algebraic...
Let $\mathbb{K}$ be a field of characteristic zero and $\mathbb{K}[x_1, \dots, x_n]$ the correspondi...