Algebraic singular functions are not always dense in the ideal of C*-singular functions

Abstract

We give the first examples of \'etale (non-Hausdorff) groupoids G whose C*-algebras contain singular elements that cannot be approximated by singular elements in Cc( G). We provide two examples: one is a bundle of groups, and the other a minimal and effective groupoid constructed from a self-similar action on an infinite alphabet. Moreover, we also prove that the Baum--Connes assembly map for the first example is not surjective, not even on the level of its essential C*-algebra.

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