Parameterized algorithms for Partial vertex covers in bipartite graphs
Abstract
In the weighted partial vertex cover problem (WPVC), we are given a graph , cost function , profit function , and positive integers and . The goal is to check whether there is a subset of cost at most , such that the total profit of edges covered by is at least . In this paper we study the fixed-parameter tractability of WPVC in bipartite graphs (WPVCB). By extending the methods of Amini et al., we show that WPVCB is FPT with respect to if . On the negative side, it is -hard for arbitrary , even when . In particular, WPVCB is -hard parameterized by . We complement this negative result by proving that for bounded-degree graphs WPVC is FPT with respect to . The same result holds for the case of WPVCB when we allow to take only one fractional vertex. Additionally, we show that WPVC is FPT with respect to . Finally, we discuss a variant of PVCB in which the edges covered are constrained to include a matching of prescribed size and derive a paramterized algorithm for the same.
Cite
@article{arxiv.1904.12011,
title = {Parameterized algorithms for Partial vertex covers in bipartite graphs},
author = {Vahan Mkrtchyan and Garik Petrosyan and K. Subramani},
journal= {arXiv preprint arXiv:1904.12011},
year = {2019}
}
Comments
12 pages, no figures