Reconstruction of Twisted Steinberg Algebras

Becky Armstrong; Gilles G de Castro; Lisa Orloff Clark; Kristin Courtney; Ying-Fen Lin; Kathryn McCormick; Jacqui Ramagge; Aidan Sims; Benjamin Steinberg

doi:10.1093/imrn/rnab291

Reconstruction of Twisted Steinberg Algebras

Becky Armstrong, Gilles G de Castro, Lisa Orloff Clark, Kristin Courtney, Ying-Fen Lin, Kathryn McCormick, Jacqui Ramagge, Aidan Sims, Benjamin Steinberg

Research output: Contribution to journal › Journal article › Research › peer-review

Abstract

We show how to recover a discrete twist over an ample Hausdorff groupoid from a pair consisting of an algebra and what we call a quasi-Cartan subalgebra. We identify precisely which twists arise in this way (namely, those that satisfy the local bisection hypothesis), and we prove that the assignment of twisted Steinberg algebras to such twists and our construction of a twist from a quasi-Cartan pair are mutually inverse. We identify the algebraic pairs that correspond to effective groupoids and to principal groupoids. We also indicate the scope of our results by identifying large classes of twists for which the local bisection hypothesis holds automatically.

Original language	English
Journal	International Mathematics Research Notices
Volume	2023
Issue number	3
Pages (from-to)	2474-2542
ISSN	1073-7928
DOIs	https://doi.org/10.1093/imrn/rnab291
Publication status	Published - Feb 2023
Externally published	Yes

Keywords

Steinberg algebra
groupoid
Cohomology
Cartan subalgebra

Documents & Links

10.1093/imrn/rnab291

SDU Link

Check access to the material in SDU Library's search engine

Cite this

@article{9ea5890da62b4e8588aa815cbbb40bf6,

title = "Reconstruction of Twisted Steinberg Algebras",

abstract = "We show how to recover a discrete twist over an ample Hausdorff groupoid from a pair consisting of an algebra and what we call a quasi-Cartan subalgebra. We identify precisely which twists arise in this way (namely, those that satisfy the local bisection hypothesis), and we prove that the assignment of twisted Steinberg algebras to such twists and our construction of a twist from a quasi-Cartan pair are mutually inverse. We identify the algebraic pairs that correspond to effective groupoids and to principal groupoids. We also indicate the scope of our results by identifying large classes of twists for which the local bisection hypothesis holds automatically.",

keywords = "Steinberg algebra, groupoid, Cohomology, Cartan subalgebra",

author = "Becky Armstrong and {de Castro}, {Gilles G} and Clark, {Lisa Orloff} and Kristin Courtney and Ying-Fen Lin and Kathryn McCormick and Jacqui Ramagge and Aidan Sims and Benjamin Steinberg",

year = "2023",

month = feb,

doi = "10.1093/imrn/rnab291",

language = "English",

volume = "2023",

pages = "2474--2542",

journal = "International Mathematics Research Notices",

issn = "1073-7928",

publisher = "Oxford University Press",

number = "3",

}

TY - JOUR

T1 - Reconstruction of Twisted Steinberg Algebras

AU - Armstrong, Becky

AU - de Castro, Gilles G

AU - Clark, Lisa Orloff

AU - Courtney, Kristin

AU - Lin, Ying-Fen

AU - McCormick, Kathryn

AU - Ramagge, Jacqui

AU - Sims, Aidan

AU - Steinberg, Benjamin

PY - 2023/2

Y1 - 2023/2

N2 - We show how to recover a discrete twist over an ample Hausdorff groupoid from a pair consisting of an algebra and what we call a quasi-Cartan subalgebra. We identify precisely which twists arise in this way (namely, those that satisfy the local bisection hypothesis), and we prove that the assignment of twisted Steinberg algebras to such twists and our construction of a twist from a quasi-Cartan pair are mutually inverse. We identify the algebraic pairs that correspond to effective groupoids and to principal groupoids. We also indicate the scope of our results by identifying large classes of twists for which the local bisection hypothesis holds automatically.

AB - We show how to recover a discrete twist over an ample Hausdorff groupoid from a pair consisting of an algebra and what we call a quasi-Cartan subalgebra. We identify precisely which twists arise in this way (namely, those that satisfy the local bisection hypothesis), and we prove that the assignment of twisted Steinberg algebras to such twists and our construction of a twist from a quasi-Cartan pair are mutually inverse. We identify the algebraic pairs that correspond to effective groupoids and to principal groupoids. We also indicate the scope of our results by identifying large classes of twists for which the local bisection hypothesis holds automatically.

KW - Steinberg algebra

KW - groupoid

KW - Cohomology

KW - Cartan subalgebra

U2 - 10.1093/imrn/rnab291

DO - 10.1093/imrn/rnab291

M3 - Journal article

SN - 1073-7928

VL - 2023

SP - 2474

EP - 2542

JO - International Mathematics Research Notices

JF - International Mathematics Research Notices

IS - 3

ER -

Reconstruction of Twisted Steinberg Algebras

Abstract

Keywords

Documents & Links

SDU Link

Fingerprint

Cite this