International audienceInter-block backtracking (IBB) computes all the solutions of sparse systems of nonlinear equations over the reals. This algorithm, introduced by Bliek et al. (1998) handles a system of equations previously decomposed into a set of (small) k × k sub-systems, called blocks. Partial solutions are computed in the different blocks in a certain order and combined together to obtain the set of global solutions. When solutions inside blocks are computed with interval-based techniques, IBB can be viewed as a new interval-based algorithm for solving decomposed systems of non-linear equations. Previous implementations used Ilog Solver and its IlcInterval library as a black box, which implied several strong limitations. New versio...
International audienceThis paper presents two new filtering operators for numerical CSPs (systems wi...
International audienceAn operator called CID and an efficient variant 3BCID were proposed in 2007. F...
Newton's Method is an important algorithm for solving nonlinear systems of equations. For any soluti...
International audienceInter-block backtracking (IBB) computes all the solutions of sparse systems of...
International audienceInter-block backtracking (IBB) computes all the solutions of sparse systems of...
Abstract. Inter-block backtracking (IBB) computes all the solutions of sparse systems of non-linear ...
10 pagesInternational audienceNumerical methods based on interval arithmetic are efficient means to ...
Interval branch and bound algorithms for finding all roots use a combination of a computational exis...
We introduce an interval Newton method for bounding solutions of systems of nonlinear equations. It ...
This paper addresses the problem of nonlinear multivariate root finding. In an earlier paper we de...
International audienceA new interval constraint propagation algorithm, called MOnotonic Hull Consist...
Cette thèse porte sur les méthodes d intervalles pour la résolution de systèmes de contraintes non l...
summary:We present a class of Newton-like methods to enclose solutions of systems of nonlinear equat...
Large and sparse nonlinear systems arise in many areas of science and technology, very often as a co...
Interval Newton methods can form the basis of algorithms for reliably finding all real roots of a sy...
International audienceThis paper presents two new filtering operators for numerical CSPs (systems wi...
International audienceAn operator called CID and an efficient variant 3BCID were proposed in 2007. F...
Newton's Method is an important algorithm for solving nonlinear systems of equations. For any soluti...
International audienceInter-block backtracking (IBB) computes all the solutions of sparse systems of...
International audienceInter-block backtracking (IBB) computes all the solutions of sparse systems of...
Abstract. Inter-block backtracking (IBB) computes all the solutions of sparse systems of non-linear ...
10 pagesInternational audienceNumerical methods based on interval arithmetic are efficient means to ...
Interval branch and bound algorithms for finding all roots use a combination of a computational exis...
We introduce an interval Newton method for bounding solutions of systems of nonlinear equations. It ...
This paper addresses the problem of nonlinear multivariate root finding. In an earlier paper we de...
International audienceA new interval constraint propagation algorithm, called MOnotonic Hull Consist...
Cette thèse porte sur les méthodes d intervalles pour la résolution de systèmes de contraintes non l...
summary:We present a class of Newton-like methods to enclose solutions of systems of nonlinear equat...
Large and sparse nonlinear systems arise in many areas of science and technology, very often as a co...
Interval Newton methods can form the basis of algorithms for reliably finding all real roots of a sy...
International audienceThis paper presents two new filtering operators for numerical CSPs (systems wi...
International audienceAn operator called CID and an efficient variant 3BCID were proposed in 2007. F...
Newton's Method is an important algorithm for solving nonlinear systems of equations. For any soluti...