Normal category of partitions of a set

Abstract

Let TX be the semigroup of all non-invertible transformations on an arbitrary set X. It is known that TX is a regular semigroup. The principal right(left) ideals of a regular semigroup S with partial left(right) translations as morphisms form a normal category R( S )(L( S )). Here we consider the category (X) of partitions of a set X and show that it admits a normal category structure and that (X) is isomorphic to the category R( TX ). We also consider the normal dual N P(X) of the power-set category P(X) associated with X and show that N P(X) is isomorphic to the partition category - (X) of the set X.