Structure of long idempotent-sum free sequences over finite cyclic semigroups

Abstract

Let S be a finite cyclic semigroup written additively. An element e of S is said to be idempotent if e+e=e. A sequence T over S is called idempotent-sum free provided that no idempotent of S can be represented as a sum of one or more terms from T. We prove that an idempotent-sum free sequence over S of length over approximately a half of the size of S is well-structured. This result generalizes the Savchev-Chen Structure Theorem for zero-sum free sequences over finite cyclic groups.