International audienceThe computer will be the most marvellous of all tools as soon as program writing and debugging will be no longer necessary-Jean-Louis Laurière (1976) A wide range of combinatorial search problems find a natural formulation in the language of sets, multisets, strings, functions, graphs or other structured objects. Bin-packing, set partitioning, set covering, combinatorial design problems, circuits and mapping problems are some of them. They are NP-complete problems originating from areas as diverse as combinatorial mathematics, operations research or artificial intelligence. These problems deal essentially with the search for discrete structured objects. While a high-level modeling approach seems more natural, many solu...
A procedure is described for tightening domain constraints of finite domain logic programs by applyi...
We introduce branch and infer, a unifying framework for integer linear programming and finite domain...
International audienceCombinatorial problems involving sets and relations are currently tackled by i...
International audienceThe computer will be the most marvellous of all tools as soon as program writi...
Many and diverse combinatorial problems have been solved successfully using finite-domain constrain...
International audienceIn this article, we apply techniques from Abstract Interpretation (a general t...
This paper formalises an analysis of finite domain programs and the resultant program transformation...
We present a unifying framework for integer linear programming and finite domain constraint programm...
This paper describes the finite domain system embedded in Oz, a higher-order concurrent constraint l...
This document introduces constraint programming in Oz. We restrict our attention to combinatorial pr...
International audienceSince their beginning in constraint programming, set solvers have been applied...
Constraint Logic Programming solvers on finite domains use constraints to prune those combinations o...
We introduce branch-and-infer, a unifying framework for integer linear programming and finite doma...
AbstractConstraint Logic Programming solvers on finite domains (CLP(FD) solvers) use constraints to ...
Abstract. Since their beginning in constraint programming, set solvers have been applied to a wide r...
A procedure is described for tightening domain constraints of finite domain logic programs by applyi...
We introduce branch and infer, a unifying framework for integer linear programming and finite domain...
International audienceCombinatorial problems involving sets and relations are currently tackled by i...
International audienceThe computer will be the most marvellous of all tools as soon as program writi...
Many and diverse combinatorial problems have been solved successfully using finite-domain constrain...
International audienceIn this article, we apply techniques from Abstract Interpretation (a general t...
This paper formalises an analysis of finite domain programs and the resultant program transformation...
We present a unifying framework for integer linear programming and finite domain constraint programm...
This paper describes the finite domain system embedded in Oz, a higher-order concurrent constraint l...
This document introduces constraint programming in Oz. We restrict our attention to combinatorial pr...
International audienceSince their beginning in constraint programming, set solvers have been applied...
Constraint Logic Programming solvers on finite domains use constraints to prune those combinations o...
We introduce branch-and-infer, a unifying framework for integer linear programming and finite doma...
AbstractConstraint Logic Programming solvers on finite domains (CLP(FD) solvers) use constraints to ...
Abstract. Since their beginning in constraint programming, set solvers have been applied to a wide r...
A procedure is described for tightening domain constraints of finite domain logic programs by applyi...
We introduce branch and infer, a unifying framework for integer linear programming and finite domain...
International audienceCombinatorial problems involving sets and relations are currently tackled by i...