English

Bicoloring covers for graphs and hypergraphs

Discrete Mathematics 2016-03-08 v4 Combinatorics

Abstract

Let the {\it bicoloring cover number χc(G)\chi^c(G)} for a hypergraph G(V,E)G(V,E) be the minimum number of bicolorings of vertices of GG such that every hyperedge eEe\in E of GG is properly bicolored in at least one of the χc(G)\chi^c(G) bicolorings. We investigate the relationship between χc(G)\chi^c(G), matchings, hitting sets, α(G)\alpha(G)(independence number) and χ(G)\chi(G) (chromatic number). We design a factor O(lognloglognlogloglogn)O(\frac{\log n}{\log \log n-\log \log \log n}) approximation algorithm for computing a bicoloring cover. We define a new parameter for hypergraphs - "cover independence number γ(G)\gamma(G)" and prove that logVγ(G)\log \frac{|V|}{\gamma(G)} and V2γ(G)\frac{|V|}{2\gamma(G)} are lower bounds for χc(G)\chi^c(G) and χ(G)\chi(G), respectively. We show that χc(G)\chi^c(G) can be approximated by a polynomial time algorithm achieving approximation ratio 11t\frac{1}{1-t}, if γ(G)=nt\gamma(G)=n^t, where t<1t<1. We also construct a particular class of hypergraphs G(V,E)G(V,E) called {\it cover friendly} hypergraphs where the ratio of α(G)\alpha(G) to γ(G)\gamma(G) can be arbitrarily large.We prove that for any t1t\geq 1, there exists a kk-uniform hypergraph GG such that the {\it clique number} ω(G)=k\omega(G)=k and χc(G)>t\chi^c(G) > t. Let m(k,x)m(k,x) denote the minimum number of hyperedges %in a kk-uniform hypergraph GG such that some kk-uniform hypergraph GG with m(k,x)m(k,x) hyperedges does not have a bicoloring cover of size xx. We show that 2(k1)x1<m(k,x)xk22(k+1)x+2 2^{(k-1)x-1} < m(k,x) \leq x \cdot k^2 \cdot 2^{(k+1)x+2}. Let the {\it dependency d(G)d(G)} of GG be the maximum number of hyperedge neighbors of any hyperedge in GG. We propose an algorithm for computing a bicoloring cover of size xx for GG if d(G)(2x(k1)e1)d(G) \leq(\frac{2^{x(k-1)}}{e}-1) using nx+kxmdnx+kx\frac{m}{d} 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

R2 v1 2026-06-22T07:48:57.539Z