We study a mixed integer linear program with m integer variables and k non-negative continuous variables in the form of the relaxation of the corner polyhedron that was introduced by Andersen, Louveaux, Weismantel and Wolsey [Inequalities from two rows of a simplex tableau, Proc. IPCO 2007, LNCS, vol. 4513, Springer, pp. 1--15]. We describe the facets of this mixed integer linear program via the extreme points of a well-defined polyhedron. We then utilize this description to give polynomial time algorithms to derive valid inequalities with optimal l_p norm for arbitrary, but fixed m. For the case of m=2, we give a refinement and a new proof of a characterization of the facets by...
One of the most important breakthroughs in the area of Mixed Integer Linear Programming (MILP) is th...
Four decades ago, Gomory introduced the corner polyhedron as a relaxation of a mixed integer set in ...
Four decades ago, Gomory introduced the corner polyhedron as a relaxation of a mixed integer set in ...
We study a mixed integer linear program with m integer variables and k non-negative continu...
We study a mixed integer linear program with m integer variables and k non-negative continuous varia...
This dissertation is devoted to solving general mixed integer optimization problems. Our main focus ...
Recently, cutting planes derived from maximal lattice-free convex sets have been studied in...
Recently, cutting planes derived from maximal lattice-free convex sets have been studied in...
Recently, cutting planes derived from maximal lattice-free convex sets have been stud-ied intensivel...
My work focuses on cutting planes technology in Mixed Integer Programming. I explore novel classes o...
This paper gives an introduction to a recently established link between the geometry of numbers and ...
The set obtained by adding all cuts whose validity follows from a maximal lattice free polyhedron wi...
We study the theoretical complexity of mixed integer programming algorithms. We first discuss the re...
Four decades ago, Gomory introduced the corner polyhedron as a relaxation of a mixed integer set in ...
One of the most important breakthroughs in the area of Mixed Integer Linear Programming (MILP) is th...
One of the most important breakthroughs in the area of Mixed Integer Linear Programming (MILP) is th...
Four decades ago, Gomory introduced the corner polyhedron as a relaxation of a mixed integer set in ...
Four decades ago, Gomory introduced the corner polyhedron as a relaxation of a mixed integer set in ...
We study a mixed integer linear program with m integer variables and k non-negative continu...
We study a mixed integer linear program with m integer variables and k non-negative continuous varia...
This dissertation is devoted to solving general mixed integer optimization problems. Our main focus ...
Recently, cutting planes derived from maximal lattice-free convex sets have been studied in...
Recently, cutting planes derived from maximal lattice-free convex sets have been studied in...
Recently, cutting planes derived from maximal lattice-free convex sets have been stud-ied intensivel...
My work focuses on cutting planes technology in Mixed Integer Programming. I explore novel classes o...
This paper gives an introduction to a recently established link between the geometry of numbers and ...
The set obtained by adding all cuts whose validity follows from a maximal lattice free polyhedron wi...
We study the theoretical complexity of mixed integer programming algorithms. We first discuss the re...
Four decades ago, Gomory introduced the corner polyhedron as a relaxation of a mixed integer set in ...
One of the most important breakthroughs in the area of Mixed Integer Linear Programming (MILP) is th...
One of the most important breakthroughs in the area of Mixed Integer Linear Programming (MILP) is th...
Four decades ago, Gomory introduced the corner polyhedron as a relaxation of a mixed integer set in ...
Four decades ago, Gomory introduced the corner polyhedron as a relaxation of a mixed integer set in ...