Extremal sequences related to the Jacobi symbol

Abstract

For a weight-set A⊂eq Zn, the A-weighted zero-sum 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 of consecutive terms. A sequence of length CA(n)-1 in Zn which does not have any A-weighted zero-sum subsequence of consecutive terms will be called a C-extremal sequence for A. Let (xn) denote the Jacobi symbol of x∈ Zn. We characterize the C-extremal sequences for the weight-set S(n)=\\,x∈ U(n):(xn)=1\,\ and for the weight-set L(n;p)=\\,x∈ U(n):(xn)=(xp)\,\ where p is a prime divisor of n. We can define D-extremal sequences for these weight-sets in a way analogous to the definition of C-extremal sequences. We also characterize these sequences.