Regular, Unit-regular, and Idempotent elements of semigroups of transformations that preserve a partition

Abstract

Let X be a set and TX be the full transformation semigroup on X. For a partition P of X, we consider semigroups T(X, P) = \f∈ TX| (∀ Xi∈ P) (∃ Xj ∈ P)\;Xi f ⊂eq Xj\, (X, P) = \f∈ T(X, P)|(∀ Xi ∈ P)\; Xf Xi ≠ \, and (X, P) = \f∈ TX|(∀ Xi∈ P)(∃ Xj∈ P)\; Xi f = Xj\. We characterize unit-regular elements of both T(X, P) and (X, P) for finite X. We discuss set inclusion between (X, P) and certain semigroups of transformations preserving P. We characterize and count regular elements and idempotents of (X, P). For finite X, we prove that every regular element of (X, P) is unit-regular and also calculate the size of (X, P).