Davenport constant for semigroups II

Abstract

Let S be a finite commutative semigroup. The Davenport constant of S, denoted D(S), is defined to be the least positive integer such that every sequence T of elements in S of length at least contains a proper subsequence T' (T'≠ T) with the sum of all terms from T' equaling the sum of all terms from T. Let q>2 be a prime power, and let q[x] be the ring of polynomials over the finite field q. Let R be a quotient ring of q[x] with 0≠ R≠ q[x]. We prove that D(SR)= D(U(SR)), where SR denotes the multiplicative semigroup of the ring R, and U(SR) denotes the group of units in SR.