B(H) is not a twisted groupoid C*-algebra

Abstract

We show that B(H) for an infinite dimensional Hilbert space H cannot be realized as the reduced twisted C*-algebra of any locally compact Hausdorff étale groupoid. The proof is based on the canonical conditional expectation Cr*(G,Σ) C0(G(0)) and a structural analysis of the resulting diagonal subalgebra inside B(H). We show that this diagonal must be an atomic abelian von Neumann algebra, and then exclude both possibilities for its spectrum. If the unit space is finite, one obtains a tracial state on Cr*(G,Σ), which is impossible for B(H). If it is infinite, the groupoid structure forces a block-sparsity phenomenon for compactly supported sections, which is incompatible with B(H). This provides the first examples of C*-algebras that cannot be realized as reduced twisted étale groupoid C*-algebras.

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