A simple upper bound for trace function of a hypergraph with applications

Abstract

Let H=(V, E) be a hypergraph on the vertex set V and edge set E⊂eq 2V. We show that number of distinct traces on any k- subset of V, is most k. α(H), where α(H) is the degeneracy of H. The result significantly improves/generalizes some of related results. For instance, the vc dimension H (or vc(H)) is shown to be at most ( α(H))+1 which was not known before. As a consequence vc(H) can be computed in computed in nO( log( δ(H))) time. When applied to the neighborhood systems of a graphs excluding a fixed minor, it reduces the known linear upper bound on the VC dimension to a logarithmic one, in the size of the minor. When applied to the location domination and identifying code numbers of any n vertex graph G, one gets the new lower bound of (n/( α(G)), where α(G) is the degeneracy of G.