We study propagation algorithms for the conjunction of two AllDifferent constraints. Solutions of an AllDifferent constraint can be seen as perfect matchings on the variable/value bipartite graph. Therefore, we investigate the problem of finding simultaneous bipartite matchings. We present an extension of the famous Hall theorem which characterizes when simultaneous bipartite matchings exists. Unfortunately, finding such matchings is NP-hard in general. However, we prove a surprising result that finding a simultaneous matching on a convex bipartite graph takes just polynomial time. Based on this theoretical result, we provide the first polynomial time bound consistency algorithm for the conjunction of two AllDifferent constraints. We identi...
Local consistency properties and algorithms for enforcing them are central to the success of Constra...
In many combinatorial problems one may need to model the diversity or similarity of sets of assignme...
Given a finite set of vectors over a finite totally ordered domain, we study the problem of computin...
International audienceWe study propagation algorithms for the conjunction of two ALLDIFFERENT constr...
We study propagation algorithms for the conjunction of two ALLDIFFERENT constraints. Solutions of an...
The ALLDIFFERENT constraint was one of the first global constraints [17] and it enforces the conjunc...
In constraint programming one models a problem by stating constraints on acceptable solutions. The c...
International audienceThis article presents new work on analyzing the behaviour of a constraint solv...
Abstract. We propose ALLDIFFPREC, a new global constraint that combines together an ALLDIFFERENT con...
This paper presents a novel symmetric graph regularization framework for pairwise constraint propaga...
This paper presents a novel symmetric graph regularization framework for pairwise constraint propaga...
In many combinatorial problems one may need to model the diversity or similarity of assignments in a...
International audienceIn this paper, we introduce a graph matching method that can account for const...
The problem of graph matching in general is NP-hard and approaches have been proposed for its subopt...
We present a convex relaxation for the multi-graph matching problem. Our formulation allows for part...
Local consistency properties and algorithms for enforcing them are central to the success of Constra...
In many combinatorial problems one may need to model the diversity or similarity of sets of assignme...
Given a finite set of vectors over a finite totally ordered domain, we study the problem of computin...
International audienceWe study propagation algorithms for the conjunction of two ALLDIFFERENT constr...
We study propagation algorithms for the conjunction of two ALLDIFFERENT constraints. Solutions of an...
The ALLDIFFERENT constraint was one of the first global constraints [17] and it enforces the conjunc...
In constraint programming one models a problem by stating constraints on acceptable solutions. The c...
International audienceThis article presents new work on analyzing the behaviour of a constraint solv...
Abstract. We propose ALLDIFFPREC, a new global constraint that combines together an ALLDIFFERENT con...
This paper presents a novel symmetric graph regularization framework for pairwise constraint propaga...
This paper presents a novel symmetric graph regularization framework for pairwise constraint propaga...
In many combinatorial problems one may need to model the diversity or similarity of assignments in a...
International audienceIn this paper, we introduce a graph matching method that can account for const...
The problem of graph matching in general is NP-hard and approaches have been proposed for its subopt...
We present a convex relaxation for the multi-graph matching problem. Our formulation allows for part...
Local consistency properties and algorithms for enforcing them are central to the success of Constra...
In many combinatorial problems one may need to model the diversity or similarity of sets of assignme...
Given a finite set of vectors over a finite totally ordered domain, we study the problem of computin...