Approximation Algorithms for Edge Partitioned Vertex Cover Problems
Abstract
We consider a natural generalization of the Partial Vertex Cover problem. Here an instance consists of a graph G = (V,E), a positive cost function c: V-> Z^{+}, a partition of the edge set , and a parameter for each partition . The goal is to find a minimum cost set of vertices which cover at least edges from the partition . We call this the Partition Vertex Cover problem. In this paper, we give matching upper and lower bound on the approximability of this problem. Our algorithm is based on a novel LP relaxation for this problem. This LP relaxation is obtained by adding knapsack cover inequalities to a natural LP relaxation of the problem. We show that this LP has integrality gap of , where is the number of sets in the partition of the edge set. We also extend our result to more general settings.
Cite
@article{arxiv.1112.1945,
title = {Approximation Algorithms for Edge Partitioned Vertex Cover Problems},
author = {Suman Kalyan Bera and Shalmoli Gupta and Amit Kumar and Sambuddha Roy},
journal= {arXiv preprint arXiv:1112.1945},
year = {2015}
}