Abstract. Given a graph G = (V,E) and positive integral vertex weights w: V → N, the max-coloring problem seeks to find a proper ver-tex coloring of G whose color classes C1, C2,..., Ck, minimize∑k i=1 maxv∈Ciw(v). The problem arises in scheduling conflicting jobs in batches and in minimizing buffer size in dedicated memory managers. In this paper we present three approximation algorithms and one inapproximability result for the max-coloring problem. We show that if for a class of graphs G, the classical problem of finding a proper vertex coloring with fewest colors has a c-approximation, then for that class G of graphs, max-coloring has a 4c-approximation algorithm. As a conse-quence, we obtain a 4-approximation algorithm to solve max-colo...
For a given graph, the Maximum k-Colorable Subgraph Problem is the problem of determining the larges...
AbstractA general technique for converting approximation algorithms for the vertex coloring problem ...
A very general technique for converting approximation algorithms for the vertex coloring problem in...
The max edge-coloring problem asks for a proper edge-coloring of an edge-weighted graph minimizing t...
The Max Edge-Coloring problem asks for a proper edge-coloring of an edge-weighted graph minimizing t...
In a bounded max-coloring of a vertex/edge weighted graph, each color class is of cardinality at mos...
We study the weighted generalization of the edge coloring problem where the goal is to minimize the ...
AbstractWe consider max coloring on hereditary graph classes. The problem is defined as follows. Giv...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
The max-coloring problem is to compute a legal coloring of the vertices of a graph G = (V, E) with a...
AbstractThe max-edge-coloring problem is a natural weighted generalization of the classical edge-col...
Abstract: We study the maximization version of the fundamental graph coloring problem. Here the goal...
The best known approximation algorithm for graph MAX CUT, due to Goemans and Williamson, first finds...
The best known approximation algorithm for graph MAX CUT, due to Goemans and Williamson, first finds...
For a given graph, the Maximum k-Colorable Subgraph Problem is the problem of determining the larges...
AbstractA general technique for converting approximation algorithms for the vertex coloring problem ...
A very general technique for converting approximation algorithms for the vertex coloring problem in...
The max edge-coloring problem asks for a proper edge-coloring of an edge-weighted graph minimizing t...
The Max Edge-Coloring problem asks for a proper edge-coloring of an edge-weighted graph minimizing t...
In a bounded max-coloring of a vertex/edge weighted graph, each color class is of cardinality at mos...
We study the weighted generalization of the edge coloring problem where the goal is to minimize the ...
AbstractWe consider max coloring on hereditary graph classes. The problem is defined as follows. Giv...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
The max-coloring problem is to compute a legal coloring of the vertices of a graph G = (V, E) with a...
AbstractThe max-edge-coloring problem is a natural weighted generalization of the classical edge-col...
Abstract: We study the maximization version of the fundamental graph coloring problem. Here the goal...
The best known approximation algorithm for graph MAX CUT, due to Goemans and Williamson, first finds...
The best known approximation algorithm for graph MAX CUT, due to Goemans and Williamson, first finds...
For a given graph, the Maximum k-Colorable Subgraph Problem is the problem of determining the larges...
AbstractA general technique for converting approximation algorithms for the vertex coloring problem ...
A very general technique for converting approximation algorithms for the vertex coloring problem in...