Zero-sum Km over Z and the story of K4

Abstract

We prove the following results solving a problem raised in [Y. Caro, R. Yuster, On zero-sum and almost zero-sum subgraphs over Z, Graphs Combin. 32 (2016), 49--63]. For a positive integer m≥ 2, m≠ 4, there are infinitely many values of n such that the following holds: There is a weighting function f:E(Kn) \-1,1\ (and hence a weighting function f: E(Kn) \-1,0,1\), such that Σe∈ E(Kn)f(e)=0 but, for every copy H of Km in Kn, Σe∈ E(H)f(e)≠ 0. On the other hand, for every integer n≥ 5 and every weighting function f:E(Kn) \-1,1\ such that |Σe∈ E(Kn)f(e)|≤ n2-h(n), where h(n)=2(n+1) if n 0 (mod 4) and h(n)=2n if n 0 (mod 4), there is always a copy H of K4 in Kn for which Σe∈ E(H)f(e)=0, and the value of h(n) is sharp.