Zero sum cycles in complete digraphs

Abstract

Given a non-trivial finite Abelian group (A,+), let n(A) 2 be the smallest integer such that for every labelling of the arcs of the bidirected complete graph of order n(A) with elements from A there exists a directed cycle for which the sum of the arc-labels is zero. The problem of determining n(Zq) for integers q 2 was recently considered by Alon and Krivelevich, who proved that n(Zq)=O(q q). Here we improve their bound and show that n(Zq) grows linearly. More generally we prove that for every finite Abelian group A we have n(A) 8|A|, while if |A| is prime then n(A) 32|A|. As a corollary we also obtain that every K16q-minor contains a cycle of length divisible by q for every integer q 2, which improves a result by Alon and Krivelevich.