Dantzig-Wolfe reformulation of a mixed integer program partially convexifies a subset of the constraints, i.e., it implicitly adds all valid inequalities for the associated integer hull. Projecting an optimal basic solution of the reformulation’s LP relaxation to the original space does in general not yield a basic solution of the original LP relaxation. Cutting planes in the original problem that are separated using a basis like Gomory mixed integer cuts are therefore not directly applicable. Range [22] (and others) proposed as a remedy to heuristically compute a basic solution and separate this auxiliary solution also with cutting planes that stem from a basis. This might not only cut off the auxiliary solution, but also the solution we o...
We consider mixed-integer linear programs with arbitrary bounded integer variables. We first describ...
My work focuses on cutting planes technology in Mixed Integer Programming. I explore novel classes o...
Both cutting plane methods and traditional decomposition methods are procedures that compute a bound...
Dantzig-Wolfe reformulation of a mixed integer program partially convexifies a subset of the constra...
Dantzig-Wolfe decomposition as applied to an integer program is a specific form of problem reformula...
In recent years, branch-and-cut algorithms have become firmly established as the most effective meth...
Here we consider the question whether the lattice reformulation of a linear integer program can be u...
Abstract In recent years, branch-and-cut algorithms have become firmly established as the most effec...
Decomposition algorithms such as Lagrangian relaxation and Dantzig-Wolfe decomposition are well-know...
In this survey we examine ways to reformulate integer and mixed integer programs. Typically, but not...
<p>In this work, we propose a cutting plane algorithm to improve optimization models that are origin...
We study the complexity of cutting planes and branching schemes from a theoretical point of view. We...
Abstract. This paper addresses the problem of generating cuts for mixed integer nonlinear programs w...
We study the complexity of cutting planes and branching schemes from a theoretical point of view. We...
The Dantzig-Wolfe decomposition has been extended to Integer Linear Programming (ILP) and Mixed Inte...
We consider mixed-integer linear programs with arbitrary bounded integer variables. We first describ...
My work focuses on cutting planes technology in Mixed Integer Programming. I explore novel classes o...
Both cutting plane methods and traditional decomposition methods are procedures that compute a bound...
Dantzig-Wolfe reformulation of a mixed integer program partially convexifies a subset of the constra...
Dantzig-Wolfe decomposition as applied to an integer program is a specific form of problem reformula...
In recent years, branch-and-cut algorithms have become firmly established as the most effective meth...
Here we consider the question whether the lattice reformulation of a linear integer program can be u...
Abstract In recent years, branch-and-cut algorithms have become firmly established as the most effec...
Decomposition algorithms such as Lagrangian relaxation and Dantzig-Wolfe decomposition are well-know...
In this survey we examine ways to reformulate integer and mixed integer programs. Typically, but not...
<p>In this work, we propose a cutting plane algorithm to improve optimization models that are origin...
We study the complexity of cutting planes and branching schemes from a theoretical point of view. We...
Abstract. This paper addresses the problem of generating cuts for mixed integer nonlinear programs w...
We study the complexity of cutting planes and branching schemes from a theoretical point of view. We...
The Dantzig-Wolfe decomposition has been extended to Integer Linear Programming (ILP) and Mixed Inte...
We consider mixed-integer linear programs with arbitrary bounded integer variables. We first describ...
My work focuses on cutting planes technology in Mixed Integer Programming. I explore novel classes o...
Both cutting plane methods and traditional decomposition methods are procedures that compute a bound...