On the Polishness of the inverse semigroup (X) on a compact metric space X
Abstract
Let (X) be the inverse semigroup of partial homeomorphisms between open subsets of a compact metric space X. There is a topology, denoted τhco, that makes (X) a topological inverse semigroup. We address the question of whether τhco is Polish. For a 0-dimensional compact metric space X, we prove that ((X), τhco) is Polish by showing that it is topologically isomorphic to a closed subsemigroup of the Polish symmetric inverse semigroup I(). We present examples, similar to the classical Munn semigroups, of Polish inverse semigroups consisting of partial isomorphism on lattices of open sets.
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