A zero-sum problem on graphs

Abstract

Call a graph G zero-forcing for a finite abelian group G if for every : V(G) G there is a connected A ⊂eq V(G) with Σa ∈ A (a) = 0. The problem we pose here is to characterise the class of zero-forcing graphs. It is shown that a connected graph is zero-forcing for the cyclic group of prime order p if and only if it has at least p vertices. When |G| is not prime, however, being zero-forcing is intimately linked to the structure of the graph. We obtain partial solutions for the general case, discuss computational issues and present several questions.