Constructs equivariant E-theory and a natural Baum-Connes assembly map for Fell bundles of inverse semigroups, covering maximal, reduced, and essential cases with applications to groupoids and Cartan pairs.
Algebraic singular functions are not always dense in the ideal of $C^*$-singular functions
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abstract
We give the first examples of \'etale (non-Hausdorff) groupoids $\mathcal G$ whose $C^*$-algebras contain singular elements that cannot be approximated by singular elements in $\mathcal C_c(\mathcal G)$. 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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math.OA 1years
2026 1verdicts
UNVERDICTED 1representative citing papers
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A Baum-Connes assembly map for essential semigroup crossed products
Constructs equivariant E-theory and a natural Baum-Connes assembly map for Fell bundles of inverse semigroups, covering maximal, reduced, and essential cases with applications to groupoids and Cartan pairs.