Completely inverse AG**-groupoids

Abstract

A completely inverse AG**-groupoid is a groupoid satisfying the identities (xy)z=(zy)x, x(yz)=y(xz) and xx-1=x-1x, where x-1 is a unique inverse of x, that is, x=(xx-1)x and x-1=(x-1x)x-1. First we study some fundamental properties of such groupoids. Then we determine certain fundamental congruences on a completely inverse AG**-groupoid; namely: the maximum idempotent-separating congruence, the least AG-group congruence and the least E-unitary congruence. Finally, we investigate the complete lattice of congruences of a completely inverse AG**-groupoids. In particular, we describe congruences on completely inverse AG**-groupoids by their kernel and trace.