English

Quantales and Fell bundles

Operator Algebras 2017-12-11 v3 Rings and Algebras

Abstract

We study Fell bundles on groupoids from the viewpoint of quantale theory. Given any saturated upper semicontinuous Fell bundle π:EG\pi:E\to G on an \'etale groupoid GG with G0G_0 locally compact Hausdorff, equipped with a suitable completion C*-algebra AA of its convolution algebra, we obtain a map of involutive quantales p:Max AΩ(G)p:\mathrm{Max}\ A\to\Omega(G), where Max A\mathrm{Max}\ A consists of the closed linear subspaces of AA and Ω(G)\Omega(G) is the topology of GG. We study various properties of pp which mimick, to various degrees, those of open maps of topological spaces. These are closely related to properties of GG, π\pi, and AA, such as GG being Hausdorff, principal, or topological principal, or π\pi being a line bundle. Under suitable conditions, which include GG being Hausdorff, but without requiring saturation of the Fell bundle, AA is an algebra of sections of the bundle if and only if it is the reduced C*-algebra Cr(G,E)C_r^*(G,E). We also prove that Max A\mathrm{Max}\ A is stably Gelfand. This implies the existence of a pseudogroup IB\mathcal{I}_B and of an \'etale groupoid B\mathfrak B associated canonically to any sub-C*-algebra BAB\subset A. We study a correspondence between Fell bundles and sub-C*-algebras based on these constructions, and compare it to the construction of Weyl groupoids from Cartan subalgebras.

Keywords

Cite

@article{arxiv.1701.08653,
  title  = {Quantales and Fell bundles},
  author = {Pedro Resende},
  journal= {arXiv preprint arXiv:1701.08653},
  year   = {2017}
}

Comments

Version 2 contains a thorough revision of the paper. It fixes some mistakes and presentation issues, and includes new material related to principal groupoids, topologically principal groupoids, and groupoids associated to sub-C*-algebras. Version 3 is the final journal version (modulo possible typos or reference updates)

R2 v1 2026-06-22T18:04:09.412Z