AbstractWhen solving a system of equations, it can be beneficial not to solve it in its entirety at once, but rather to decompose it into smaller subsystems that can be solved in order. Based on a bisimplicial graph representation we analyze the parameterized complexity of two problems central to such a decomposition: The Free Square Block problem related to finding smallest subsystems that can be solved separately, and the Bounded Block Decomposition problem related to determining a decomposition where the largest subsystem is as small as possible. We show both problems to be W[1]-hard. Finally we relate these problems to crown structures and settle two open questions regarding them using our results
Underdetermined systems of equations in which the minimum norm solution needs to be computed arise i...
Given a bipartite graph G, we consider the decision problem called BicliqueCover for a fixed positiv...
This paper reviews structural problem decomposition methods, such as tree and path decompositions. I...
When solving a system of equations, it can be beneficial not to solve it in its entirety at once, bu...
When solving a system of equations, it can be beneficial not to solve it in its entirety at once, bu...
Solving large systems of equations is a problem often encountered in engineering disciplines. Howeve...
International audienceGeometric modeling by constraints leads to large systems of algebraic equation...
This book presents the results of the research of the sparse underdetermined systems of linear algeb...
Checking whether a system of linear equations is consistent is a basic computational problem with ub...
Stanley decompositions are used in invariant theory and the theory of normal forms for dynamical sys...
AbstractWe construct an algorithm for a cylindrical cell decomposition of a closed cube In⊂Rn compat...
International audienceWe bound the Boolean complexity of computing isolating hyperboxes for all comp...
AbstractThis paper is concerned with exact real solving of well-constrained, bivariate polynomial sy...
We present an algorithm for isolating all roots of an arbitrary complex polynomial p that also works...
AbstractWe study the computational complexity of the isomorphism and equivalence problems on systems...
Underdetermined systems of equations in which the minimum norm solution needs to be computed arise i...
Given a bipartite graph G, we consider the decision problem called BicliqueCover for a fixed positiv...
This paper reviews structural problem decomposition methods, such as tree and path decompositions. I...
When solving a system of equations, it can be beneficial not to solve it in its entirety at once, bu...
When solving a system of equations, it can be beneficial not to solve it in its entirety at once, bu...
Solving large systems of equations is a problem often encountered in engineering disciplines. Howeve...
International audienceGeometric modeling by constraints leads to large systems of algebraic equation...
This book presents the results of the research of the sparse underdetermined systems of linear algeb...
Checking whether a system of linear equations is consistent is a basic computational problem with ub...
Stanley decompositions are used in invariant theory and the theory of normal forms for dynamical sys...
AbstractWe construct an algorithm for a cylindrical cell decomposition of a closed cube In⊂Rn compat...
International audienceWe bound the Boolean complexity of computing isolating hyperboxes for all comp...
AbstractThis paper is concerned with exact real solving of well-constrained, bivariate polynomial sy...
We present an algorithm for isolating all roots of an arbitrary complex polynomial p that also works...
AbstractWe study the computational complexity of the isomorphism and equivalence problems on systems...
Underdetermined systems of equations in which the minimum norm solution needs to be computed arise i...
Given a bipartite graph G, we consider the decision problem called BicliqueCover for a fixed positiv...
This paper reviews structural problem decomposition methods, such as tree and path decompositions. I...