Strong $(r,p)$ Cover for Hypergraphs
Abstract
We introduce the notion of the { \it strong cover} number for -uniform hypergraphs , where denotes the minimum number of -colorings of vertices in such that each hyperedge in contains at least vertices of distinct colors in at least one of the -colorings. We derive the exact values of for small values of , , and , where denotes the complete -uniform hypergraph of vertices. We study the variation of with respect to changes in , , and ; we show that is at least (i) , and, (ii) , where is any -vertex induced sub-hypergraph of . We establish a general upper bound for for complete -uniform hypergraphs using a divide-and-conquer strategy for arbitrary values of , and . We also relate to the number of hyperedges, and the maximum {\it hyperedge degree (dependency)} , as follows. We show that for integer , if , for any -uniform hypergraph. We prove that a { \it strong cover} of size can be computed in randomized polynomial time if .
Cite
@article{arxiv.1507.03160,
title = {Strong $(r,p)$ Cover for Hypergraphs},
author = {Tapas Kumar Mishra and Sudebkumar Prasant Pal},
journal= {arXiv preprint arXiv:1507.03160},
year = {2015}
}