The treewidth of 2-section of hypergraphs

Abstract

Let H=(V,F) be a simple hypergraph without loops. H is called linear if |f g| 1 for any f,g∈ F with f=g. The 2-section of H, denoted by [H]2, is a graph with V([H]2)=V and for any u,v∈ V([H]2), uv∈ E([H]2) if and only if there is f∈ F such that u,v∈ f. The treewidth of a graph is an important invariant in structural and algorithmic graph theory. In this paper, we consider the treewidth of the 2-section of a linear hypergraph. We will use the minimum degree, maximum degree, anti-rank and average rank of a linear hypergraph to determine the upper and lower bounds of the treewidth of its 2-section. Since for any graph G, there is a linear hypergraph H such that [H]2 G, we provide a method to estimate the bound of treewidth of graph by the parameters of the hypergraph.