Semigroups of (linear) transformations whose restrictions belong to a given semigroup

Abstract

Let T(X) (resp. L(V)) be the semigroup of all transformations (resp. linear transformations) of a set X (resp. vector space V). For a subset Y of X and a subsemigroup S(Y) of T(Y), consider the subsemigroup TS(Y)(X) = \f∈ T(X) f_Y ∈ S(Y)\ of T(X), where f_Y∈ T(Y) agrees with f on Y. We give a new characterization for TS(Y)(X) to be a regular semigroup [inverse semigroup]. For a subspace W of V and a subsemigroup S(W) of L(W), we define an analogous subsemigroup LS(W)(V) = \f∈ L(V) f_W ∈ S(W)\ of L(V). We describe regular elements in LS(W)(V) and determine when LS(W)(V) is a regular semigroup [inverse semigroup, completely regular semigroup]. If S(Y) (resp. S(W)) contains the identity of T(Y) (resp. L(W)), we describe unit-regular elements in TS(Y)(X) (resp. LS(W)(V)) and determine when TS(Y)(X) (resp. LS(W)(V)) is a unit-regular semigroup.