The relaxation complexity rc(X) of the set of integer points X contained in a polyhedron is the minimal number of inequalities needed to formulate a linear optimization problem over X without using auxiliary variables. Besides its relevance in integer programming, this concept has interpretations in aspects of social choice, symmetric cryptanalysis, and machine learning. We employ efficient mixed-integer programming techniques to compute a robust and numerically more practical variant of the relaxation complexity. Our proposed models require row or column generation techniques and can be enhanced by symmetry handling and suitable propagation algorithms. Theoretically, we compare the quality of our models in terms of their LP relaxation valu...
Abstract. We study the application of limited-width MDDs (multi-valued decision diagrams) as discret...
Cutting planes for mixed integer problems (MIP) are nowadays an integral part of all general purpos...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
The relaxation complexity rc(X) of the set of integer points X contained in a polyhedron is the mini...
International audienceVarious techniques for building relaxations and generating valid inequalities ...
We study the computational power of general symmetric relaxations for combinatorial optimization pro...
Mixed-integer programming (MIP) is often a practitioner’s primary approach when tackling hard discre...
We study a mixed integer linear program with m integer variables and k non-negative continu...
AbstractIn this paper we introduce DRL*, a new hierarchy of linear relaxations for 0–1 mixed integer...
The relaxation complexity rc(X) of the set of integer points X contained in a polyhedron is the smal...
This dissertation is devoted to solving general mixed integer optimization problems. Our main focus ...
We study the application of limited-width MDDs (multi-valued decision diagrams) as discrete relaxati...
In this work, different relaxations applicable to an MPC problem with a mix of real valued and binar...
AbstractThis paper is concerned with the generation of tight equivalent representations for mixed-in...
We study a mixed integer linear program with m integer variables and k non-negative continuous varia...
Abstract. We study the application of limited-width MDDs (multi-valued decision diagrams) as discret...
Cutting planes for mixed integer problems (MIP) are nowadays an integral part of all general purpos...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
The relaxation complexity rc(X) of the set of integer points X contained in a polyhedron is the mini...
International audienceVarious techniques for building relaxations and generating valid inequalities ...
We study the computational power of general symmetric relaxations for combinatorial optimization pro...
Mixed-integer programming (MIP) is often a practitioner’s primary approach when tackling hard discre...
We study a mixed integer linear program with m integer variables and k non-negative continu...
AbstractIn this paper we introduce DRL*, a new hierarchy of linear relaxations for 0–1 mixed integer...
The relaxation complexity rc(X) of the set of integer points X contained in a polyhedron is the smal...
This dissertation is devoted to solving general mixed integer optimization problems. Our main focus ...
We study the application of limited-width MDDs (multi-valued decision diagrams) as discrete relaxati...
In this work, different relaxations applicable to an MPC problem with a mix of real valued and binar...
AbstractThis paper is concerned with the generation of tight equivalent representations for mixed-in...
We study a mixed integer linear program with m integer variables and k non-negative continuous varia...
Abstract. We study the application of limited-width MDDs (multi-valued decision diagrams) as discret...
Cutting planes for mixed integer problems (MIP) are nowadays an integral part of all general purpos...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...