A semigroup is finite if and only if it is chain-finite and antichain-finite

Abstract

A subset A of a semigroup S is called a chain (antichain) if xy∈\x,y\ (xy\x,y\) for any (distinct) elements x,y∈ S. A semigroup S is called (anti)chain-finite if S contains no infinite (anti)chains. We prove that each antichain-finite semigroup S is periodic and for every idempotent e of S the set [∞]e=\x∈ S:∃ n∈ N\;\;(xn=e)\ is finite. This property of antichain-finite semigroups is used to prove that a semigroup is finite if and only if it is chain-finite and antichain-finite. Also we present an example of an antichain-finite semilattice that is not a union of finitely many chains.