Restricted Parameter Range Promise Set Cover Problems Are Easy
Abstract
Let be an instance of Set Cover Problem, where is a element ground set, is a set of subsets of satisfying and is a positive integer. In STOC 1993 M. Bellare, S. Goldwasser, C. Lund and A. Russell proved the NP-hardness to distinguish the following two cases of for any constant . The Yes case is the instance for which there is an exact cover of size and the No case is the instance for which any cover of from has size at least . This was improved by R. Raz and S. Safra in STOC 1997 about the NP-hardness for for some constant . In this paper we prove that restricted parameter range subproblem is easy. For any given function of satisfying , we give a polynomial time algorithm not depending on to distinguish between {\bf YES:} The instance where , for which there exists an exact cover of size at most ; {\bf NO:} The instance where , for which any cover from has size larger than . The polynomial time reduction of this restricted parameter range set cover problem is constructed by using the lattice.
Cite
@article{arxiv.1110.1896,
title = {Restricted Parameter Range Promise Set Cover Problems Are Easy},
author = {Hao Chen},
journal= {arXiv preprint arXiv:1110.1896},
year = {2011}
}
Comments
10 pages