English

Restricted Parameter Range Promise Set Cover Problems Are Easy

Computational Complexity 2011-10-11 v1

Abstract

Let (U,S,d)({\bf U},{\bf S},d) be an instance of Set Cover Problem, where U={u1,...,un}{\bf U}=\{u_1,...,u_n\} is a nn element ground set, S={S1,...,Sm}{\bf S}=\{S_1,...,S_m\} is a set of mm subsets of U{\bf U} satisfying i=1mSi=U\bigcup_{i=1}^m S_i={\bf U} and dd 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 GapSetCoverη{\bf GapSetCover_{\eta}} for any constant η>1\eta > 1. The Yes case is the instance for which there is an exact cover of size dd and the No case is the instance for which any cover of U{\bf U} from S{\bf S} has size at least ηd\eta d. This was improved by R. Raz and S. Safra in STOC 1997 about the NP-hardness for GapSetCoverclogm{\bf GapSetCover}_{clogm} for some constant cc. In this paper we prove that restricted parameter range subproblem is easy. For any given function of nn satisfying η(n)1\eta(n) \geq 1, we give a polynomial time algorithm not depending on η(n)\eta(n) to distinguish between {\bf YES:} The instance (U,S,d)({\bf U},{\bf S}, d) where d>2S3η(n)1d>\frac{2 |{\bf S}|}{3\eta(n)-1}, for which there exists an exact cover of size at most dd; {\bf NO:} The instance (U,S,d)({\bf U},{\bf S}, d) where d>2S3η(n)1d>\frac{2 |{\bf S}|}{3\eta(n)-1}, for which any cover from S{\bf S} has size larger than η(n)d\eta(n) d. The polynomial time reduction of this restricted parameter range set cover problem is constructed by using the lattice.

Keywords

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

R2 v1 2026-06-21T19:17:35.931Z