Semigroups of transformations whose characters belong to a given semigroup
Abstract
Let X be a nonempty set and P=\Xi i∈ I\ a partition of X. Denote by T(X) the full transformation semigroup on X, and T(X, P) the subsemigroup of T(X) consisting of all transformations that preserve P. For every subsemigroup S(I) of T(I), let TS(I)(X,P) be the semigroup of all transformations f∈ T(X, P) such that (f)∈ S(I), where (f)∈ T(I) defined by i(f)=j whenever Xif⊂eq Xj. We describe regular and idempotent elements in TS(I)(X,P), and determine when TS(I)(X,P) is a regular semigroup [inverse semigroup]. With the assumption that S(I) contains the identity, we characterize Green's relations on TS(I)(X,P), describe unit-regular elements in TS(I)(X,P), and determine when TS(I)(X,P) is a unit-regular semigroup. We apply these general results to obtain more concrete results for T(X,P).
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.