Fej\'er property and Galois correspondence for groupoid C*-algebras

Abstract

We introduce a notion of the Fej\'er property for topological \'etale groupoids. As a consequence, we show that when G is a principal \'etale second countable groupoid satisfying the Fej\'er property, every closed C0(G0)-bimodule M⊂ Cr*(G) is of the form Cc(U)r for some open set U. Moreover, we get a Galois correspondence in the sense that every intermediate C*-algebra B with C0(G0)⊂eq B⊂eq Cr*(G) is of the form Cr*(H) for some open subgroupoid H≤ G.

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