An elegant 3-basis for inverse semigroups

Abstract

It is well known that in every inverse semigroup the binary operation and the unary operation of inversion satisfy the following three identities: [ x=(xx')x (xx')(y'y)=(y'y)(xx') (xy)z=x(yz"). ] The goal of this note is to prove the converse, that is, we prove that an algebra of type <2,1> satisfying these three identities is an inverse semigroup and the unary operation coincides with the usual inversion on such semigroups.