On unit-weighted zero-sum constants of Zn

Abstract

Given A⊂eq Zn, the constant CA(n) is defined to be the smallest natural number k such that any sequence of k elements in Zn has an A-weighted zero-sum subsequence having consecutive terms. The value of CU(n)(n) is known when n is odd. We give a different argument to determine the value of CU(n)(n) for any n. A C-extremal sequence for U(n) is a sequence in Zn whose length is CU(n)(n)-1 and which does not have any U(n)-weighted zero-sum subsequence having consecutive terms. We characterize the C-extremal sequences for U(n) when n is a power of 2. For any n, we determine the value of CA(n) where A is the set of all odd (or all even) elements of Zn and also when A=\1,2,…,r\ where r<n.