39 research outputs found
Completely inverse -groupoids
A completely inverse -groupoid is a groupoid satisfying the
identities , and , where
is a unique inverse of , that is, and
. First we study some fundamental properties of such
groupoids. Then we determine certain fundamental congruences on a completely
inverse -groupoid; namely: the maximum idempotent-separating
congruence, the least -group congruence and the least -unitary
congruence. Finally, we investigate the complete lattice of congruences of a
completely inverse -groupoids. In particular, we describe congruences
on completely inverse -groupoids by their kernel and trace
Congruences on Menger algebras
We discuss some types of congruences on Menger algebras of rank , which
are generalizations of the principal left and right congruences on semigroups.
We also study congruences admitting various types of cancellations and describe
their relationship with strong subsets