Bicoloring covers for graphs and hypergraphs
Abstract
Let the {\it bicoloring cover number } for a hypergraph be the minimum number of bicolorings of vertices of such that every hyperedge of is properly bicolored in at least one of the bicolorings. We investigate the relationship between , matchings, hitting sets, (independence number) and (chromatic number). We design a factor approximation algorithm for computing a bicoloring cover. We define a new parameter for hypergraphs - "cover independence number " and prove that and are lower bounds for and , respectively. We show that can be approximated by a polynomial time algorithm achieving approximation ratio , if , where . We also construct a particular class of hypergraphs called {\it cover friendly} hypergraphs where the ratio of to can be arbitrarily large.We prove that for any , there exists a -uniform hypergraph such that the {\it clique number} and . Let denote the minimum number of hyperedges %in a -uniform hypergraph such that some -uniform hypergraph with hyperedges does not have a bicoloring cover of size . We show that . Let the {\it dependency } of be the maximum number of hyperedge neighbors of any hyperedge in . We propose an algorithm for computing a bicoloring cover of size for if using random bits.
Keywords
Cite
@article{arxiv.1501.00343,
title = {Bicoloring covers for graphs and hypergraphs},
author = {Tapas Kumar Mishra and Sudebkumar Prasant Pal},
journal= {arXiv preprint arXiv:1501.00343},
year = {2016}
}
Comments
20 pages, 3 figures