Minimum-Weight Edge Discriminator in Hypergraphs

Abstract

In this paper we introduce the concept of minimum-weight edge-discriminators in hypergraphs, and study its various properties. For a hypergraph H=( V, E), a function λ: V→ Z+\0\ is said to be an edge-discriminator on H if Σv∈ Eiλ(v)>0, for all hyperedges Ei∈ E, and Σv∈ Eiλ(v) Σv∈ Ejλ(v), for every two distinct hyperedges Ei, Ej ∈ E. An optimal edge-discriminator on H, to be denoted by λ H, is an edge-discriminator on H satisfying Σv∈ Vλ H (v)=λΣv∈ Vλ(v), where the minimum is taken over all edge-discriminators on H. We prove that any hypergraph H=( V, E), with | E|=n, satisfies Σv∈ V λ H(v)≤ n(n+1)/2, and equality holds if and only if the elements of E are mutually disjoint. For r-uniform hypergraphs H=( V, E), it follows from results on Sidon sequences that Σv∈ Vλ H(v)≤ | V|r+1+o(| V|r+1), and the bound is attained up to a constant factor by the complete r-uniform hypergraph. Next, we construct optimal edge-discriminators for some special hypergraphs, which include paths, cycles, and complete r-partite hypergraphs. Finally, we show that no optimal edge-discriminator on any hypergraph H=( V, E), with | E|=n (≥ 3), satisfies Σv∈ V λ H (v)=n(n+1)/2-1, which, in turn, raises many other interesting combinatorial questions.