The ideal structure of C*-algebras of etale groupoids with isotropy groups of local polynomial growth
Abstract
Given an amenable second countable Hausdorff locally compact \'etale groupoid G such that each isotropy group Gxx has local polynomial growth, we give a description of Prim C*( G) as a topological space in terms of the topology on G and representation theory of the isotropy groups and their subgroups. The description simplifies when either the isotropy groups are FC-hypercentral or G is the transformation groupoid X defined by an action X with locally finite stabilizers. To illustrate the class of C*-algebras for which our results can provide a complete description of the ideal structure, we compute the primitive spectrum of SL3( Z) C0(SL3( R)/U3( R)), where U3( R) is the group of unipotent upper triangular matrices.
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