Add to ORKGInternational audienceMINLP problems are hard constrained optimization problems, with nonlinear constraints and mixed discrete continuous variables. They can be solved using a Branch-and-Bound scheme combining several methods, such as linear programming, interval analysis, and cutting methods. Our goal is to integrate constraint programming techniques in this framework. Firstly, global constraints can be introduced to reformulate MINLP problems thus leading to clean models and more precise computations. Secondly, interval-based approximation techniques for nonlinear constraints can be improved by taking into account the integrality of variables early. These methods have been implemented in an interval solver and we present experimental resu...
Abstract. Nonlinear constraints over the real numbers appear in many application domains, like chemi...
International audienceWe study the problem of finding the global optimum of a nonlinear real functio...
Nonlinear constraints over the real numbers appear in many application domains, like chemistry, econ...
Constraint programming is often associated with solving problems over finite domains. Many applicati...
International audienceResearchers from interval analysis and constraint (logic) programming communit...
AbstractWe give a short overview of the general ideas involved in solving optimization problems usin...
Since about thirty years, interval Branch and Bound algorithms are increasingly used to solve constr...
Since about thirty years, interval Branch and Bound algorithms are increasingly used to solve constr...
International audienceBound constrained global optimization problems can be solved by interval branc...
Most interval branch and bound methods for nonlinear algebraic systems have to date been based on im...
AbstractAn interval algorithm for bounding the solutions of a constrained global optimization proble...
Depuis quelques années, la méthode de séparation et évaluation par intervalles (Interval Branch and ...
Depuis une vingtaine d’années, la résolution de problèmes d’optimisation globale non convexes avec c...
Many optimization problems involve integer and continuous variables that can be modeled as mixed in...
Selection of extended papers from the third international workshop on interval analysis, constraint ...
Abstract. Nonlinear constraints over the real numbers appear in many application domains, like chemi...
International audienceWe study the problem of finding the global optimum of a nonlinear real functio...
Nonlinear constraints over the real numbers appear in many application domains, like chemistry, econ...
Constraint programming is often associated with solving problems over finite domains. Many applicati...
International audienceResearchers from interval analysis and constraint (logic) programming communit...
AbstractWe give a short overview of the general ideas involved in solving optimization problems usin...
Since about thirty years, interval Branch and Bound algorithms are increasingly used to solve constr...
Since about thirty years, interval Branch and Bound algorithms are increasingly used to solve constr...
International audienceBound constrained global optimization problems can be solved by interval branc...
Most interval branch and bound methods for nonlinear algebraic systems have to date been based on im...
AbstractAn interval algorithm for bounding the solutions of a constrained global optimization proble...
Depuis quelques années, la méthode de séparation et évaluation par intervalles (Interval Branch and ...
Depuis une vingtaine d’années, la résolution de problèmes d’optimisation globale non convexes avec c...
Many optimization problems involve integer and continuous variables that can be modeled as mixed in...
Selection of extended papers from the third international workshop on interval analysis, constraint ...
Abstract. Nonlinear constraints over the real numbers appear in many application domains, like chemi...
International audienceWe study the problem of finding the global optimum of a nonlinear real functio...
Nonlinear constraints over the real numbers appear in many application domains, like chemistry, econ...