AbstractA general technique for converting approximation algorithms for the vertex coloring problem in a class of graphs into approximation algorithms for the maximum weight independent set problem (MWIS) in the same class of graphs is presented. The technique consists of solving an LP-relaxation of the MWIS problem with certain clique inequalities, constructing an instance of the vertex coloring problem from the LP solution, applying the coloring algorithm to this instance, and selecting the best resulting color class as the MWIS solution. The approximation ratio obtained is the product of the approximation ratio with which the LP formulation can be solved (usually equal to one) and the approximation ratio of the coloring algorithm with re...
We propose polynomial time approximation algorithms for a novel maximum edge coloring problem which ...
AbstractUsing ideas and results from polynomial time approximation and exact computation we design a...
AbstractWe propose a polynomial time approximation algorithm for a novel maximum edge coloring probl...
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...
We study the weighted generalization of the edge coloring problem where the goal is to minimize the ...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
We give deterministic distributed (1+epsilon)-approximation algorithms for Minimum Vertex Coloring a...
AbstractSome open questions concerning the complexity of approximation algorithms for the Maximum In...
We give deterministic distributed $(1+\epsilon)$-approximation algorithms for Minimum Vertex Colorin...
We prove the following result about approximating the maximum independent set in a graph. Informally...
AbstractWe present a polynomial-time approximation algorithm for legally coloring as many edges of a...
Abstract. Given a graph G = (V,E) and positive integral vertex weights w: V → N, the max-coloring pr...
We propose polynomial time approximation algorithms for a novel maximum edge coloring problem which ...
AbstractUsing ideas and results from polynomial time approximation and exact computation we design a...
AbstractWe propose a polynomial time approximation algorithm for a novel maximum edge coloring probl...
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...
We study the weighted generalization of the edge coloring problem where the goal is to minimize the ...
We study the following generalization of the classical edge coloring problem: Given a weighted graph...
We give deterministic distributed (1+epsilon)-approximation algorithms for Minimum Vertex Coloring a...
AbstractSome open questions concerning the complexity of approximation algorithms for the Maximum In...
We give deterministic distributed $(1+\epsilon)$-approximation algorithms for Minimum Vertex Colorin...
We prove the following result about approximating the maximum independent set in a graph. Informally...
AbstractWe present a polynomial-time approximation algorithm for legally coloring as many edges of a...
Abstract. Given a graph G = (V,E) and positive integral vertex weights w: V → N, the max-coloring pr...
We propose polynomial time approximation algorithms for a novel maximum edge coloring problem which ...
AbstractUsing ideas and results from polynomial time approximation and exact computation we design a...
AbstractWe propose a polynomial time approximation algorithm for a novel maximum edge coloring probl...