A topological correspondence between partial actions of groups and inverse semigroup actions

Abstract

We present some generalizations of the well-known correspondence, found by R. Exel, between partial actions of a group G on a set X and semigroup homomorphism of S(G) on the semigroup I(X) of partial bijections of X, being S(G) an inverse monoid introduced by Exel. We show that any unital premorphism θ:G S, where S is an inverse monoid, can be extended to a semigroup homomorphism θ*:T S for any inverse semigroup T with S(G)⊂eq T⊂eq P*(G)× G, being P*(G) the semigroup of non-empty subset of G, and such that E(S) satisfies some lattice theoretical condition. We also consider a topological version of this result. We present a minimal Hausdorff inverse semigroup topology on (X), the inverse semigroup of partial homeomorphism between open subsets of a locally compact Hausdorff space X.

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