AbstractGiven an undirected node-weighted graph and a positive integer k, the maximum k-colorable subgraph problem is to select a k-colorable induced subgraph of largest weight. The natural integer programming formulation for this problem exhibits a high degree of symmetry which arises by permuting the color classes. It is well known that such symmetry has negative effects on the performance of branch-and-cut algorithms. Orbitopes are a polyhedral way to handle such symmetry and were introduced in Kaibel and Pfetsch (2008) [2].The main goal of this paper is to investigate the polyhedral consequences of combining problem-specific structure with orbitope structure. We first show that the LP-bound of the integer programming formulation mention...
In this thesis we study algorithmic aspects of two graph partitioning problems -- graph coloring and...
The study of cohesive subgroups is an important aspect of social network analysis. Cohesive subgroup...
This thesis is a study of the faces of certain combinatorially defined polyhedra. In particular, we...
AbstractGiven an undirected node-weighted graph and a positive integer k, the maximum k-colorable su...
For a given graph, the Maximum k-Colorable Subgraph Problem is the problem of determining the larges...
The maximum $k$-colorable subgraph (M$k$CS) problem is to find an induced $k$-colorable subgraph wit...
Let k(n) = (V,E) be the complete undirected graph with weights c(e) associated to the edges in E. We...
In this paper we consider a combinatorial optimisation problem that takes as input a graph in which ...
AbstractIn the Maximum Common Edge Subgraph Problem (MCES), given two graphs G and H with the same n...
Abstract: We study the maximization version of the fundamental graph coloring problem. Here the goal...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
In this paper we present an exact algorithm for the Maximum Common Induced Subgraph Problem (MCIS) ...
In Michael Jünger and Petra Mutzel [Algorithmica, 16 (1996)] we used a branch-and-cut algorithm in o...
A coloring of the vertices of a graph G is convex if, for each assigned color d, the vertices with c...
Abstract. We introduce orbitopes as the convex hulls of 0/1-matrices that are lexicographically maxi...
In this thesis we study algorithmic aspects of two graph partitioning problems -- graph coloring and...
The study of cohesive subgroups is an important aspect of social network analysis. Cohesive subgroup...
This thesis is a study of the faces of certain combinatorially defined polyhedra. In particular, we...
AbstractGiven an undirected node-weighted graph and a positive integer k, the maximum k-colorable su...
For a given graph, the Maximum k-Colorable Subgraph Problem is the problem of determining the larges...
The maximum $k$-colorable subgraph (M$k$CS) problem is to find an induced $k$-colorable subgraph wit...
Let k(n) = (V,E) be the complete undirected graph with weights c(e) associated to the edges in E. We...
In this paper we consider a combinatorial optimisation problem that takes as input a graph in which ...
AbstractIn the Maximum Common Edge Subgraph Problem (MCES), given two graphs G and H with the same n...
Abstract: We study the maximization version of the fundamental graph coloring problem. Here the goal...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
In this paper we present an exact algorithm for the Maximum Common Induced Subgraph Problem (MCIS) ...
In Michael Jünger and Petra Mutzel [Algorithmica, 16 (1996)] we used a branch-and-cut algorithm in o...
A coloring of the vertices of a graph G is convex if, for each assigned color d, the vertices with c...
Abstract. We introduce orbitopes as the convex hulls of 0/1-matrices that are lexicographically maxi...
In this thesis we study algorithmic aspects of two graph partitioning problems -- graph coloring and...
The study of cohesive subgroups is an important aspect of social network analysis. Cohesive subgroup...
This thesis is a study of the faces of certain combinatorially defined polyhedra. In particular, we...