We study the multi-layer crossing minimization problem from a polyhedral point of view. After the introduction of an integer programming formulation of the multi-layer crossing minimization problem, we examine the 2-layer case and derive several classes of facets of the associated polytope. Preliminary computational results for 2- and 3-layer instances indicate, that the usage of the corresponding facet-defining inequalities in a branch-and-cut approach may only lead to a practically useful algorithm, if deeper polyhedral studies are conducted
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
AbstractWe investigate crossing minimization problems for a set of permutations, where a crossing ex...
AbstractIn this paper we propose a branch-and-cut algorithm for the exact solution of an integer mul...
We study the multi-layer crossing minimization problem from a polyhedral point of view. After the in...
We study the multi-layer crossing minimization problem from a polyhedral point of view. After the in...
Several applications use algorithms for drawing k-layered networks and, in particular, 2-layered net...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
We study the \tlpp s that have applications in Automatic Graph Drawing. We are searching for a two-l...
We present algorithms for the two layer straightline crossing minimization problem that are able to ...
We present algorithms for the 2-layer straightline crossing minimization problem that are able to co...
This chapter discusses polyhedral approaches in combinatorial optimization. Using a cutting-plane al...
We present algorithms for the two layer straightline crossing minimization problem that are able to ...
A common method for drawing directed graphs is, as a first step, to partition the vertices into a se...
We present a new method for the application of 2-layer crossing reduction algorithms to layered comp...
We present algorithms for the two layer straightline crossing minimization problem that are able to ...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
AbstractWe investigate crossing minimization problems for a set of permutations, where a crossing ex...
AbstractIn this paper we propose a branch-and-cut algorithm for the exact solution of an integer mul...
We study the multi-layer crossing minimization problem from a polyhedral point of view. After the in...
We study the multi-layer crossing minimization problem from a polyhedral point of view. After the in...
Several applications use algorithms for drawing k-layered networks and, in particular, 2-layered net...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
We study the \tlpp s that have applications in Automatic Graph Drawing. We are searching for a two-l...
We present algorithms for the two layer straightline crossing minimization problem that are able to ...
We present algorithms for the 2-layer straightline crossing minimization problem that are able to co...
This chapter discusses polyhedral approaches in combinatorial optimization. Using a cutting-plane al...
We present algorithms for the two layer straightline crossing minimization problem that are able to ...
A common method for drawing directed graphs is, as a first step, to partition the vertices into a se...
We present a new method for the application of 2-layer crossing reduction algorithms to layered comp...
We present algorithms for the two layer straightline crossing minimization problem that are able to ...
The polyhedral approach is one of the most powerful techniques available for solving hard combinator...
AbstractWe investigate crossing minimization problems for a set of permutations, where a crossing ex...
AbstractIn this paper we propose a branch-and-cut algorithm for the exact solution of an integer mul...