The primitive spectrum of C*-algebras of etale groupoids with abelian isotropy
Abstract
Given a Hausdorff locally compact \'etale groupoid G, we describe as a topological space the part of the primitive spectrum of C*( G) obtained by inducing one-dimensional representations of amenable isotropy groups of G. When G is amenable, second countable, with abelian isotropy groups, our result gives the description of Prim C*( G) conjectured by van Wyk and Williams. This, in principle, completely determines the ideal structure of a large class of separable C*-algebras, including the transformation group C*-algebras defined by amenable actions of discrete groups with abelian stabilizers and the C*-algebras of higher rank graphs. As an illustration we describe the primitive spectrum of the C*-algebra of any row-finite higher rank graph without sources.
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