Relative topological principality and the ideal intersection property for groupoid C*-algebras
Abstract
We introduce the notion of relative topological principality for a family \Hα\ of open subgroupoids of a Hausdorff \'etale groupoid G. The C*-algebras C*r(Hα) of the groupoids Hα embed in C*r(G) and we show that if G is topologically principal relative to \Hα\ then a representation of C*r(G) is faithful if and only if its restriction to each of the subalgebras C*r(Hα) is faithful. This variant of the ideal intersection property potentially involves several subalgebras, and gives a new method of verifying injectivity of representations of reduced groupoid C*-algebras. As applications we prove a uniqueness theorem for Toeplitz C*-algebras of left cancellative small categories that generalizes a recent result of Laca and Sehnem for Toeplitz algebras of group-embeddable monoids, and we also discuss and compare concrete examples arising from integer arithmetic.
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