Support-sensitive bounds for shortest zero-sum subsequences

Abstract

For a sequence S over a finite abelian group, let MZ(S) denote the length of the shortest nonempty zero-sum subsequence of S. We prove that if G is finite abelian of order n and S has length n, then MZ(S) n-|(S)|+1. The same bound holds for every sequence of length at least |G|. In cyclic groups we combine this elementary support bound with the Savchev--Chen structure theorem for long zero-sumfree sequences and obtain the sharper estimate MZ(S) n-t(t-1)/2, where t=|(S)|, whenever S has length n over Cn and MZ(S)-1>n/2. As a consequence, every length-n sequence over Cn with support size 3 has a zero-sum subsequence of length at most n-3, and this is sharp for n 5. We also give an arithmetic application to products of prime ideals in a number field, phrased in the standard class-group and block-monoid setting and a corresponding cyclic class-group sharpening.