Non-Supramenable Groups Acting on Locally Compact Spaces

Centre for Symmetry and Deformation

Non-Supramenable Groups Acting on Locally Compact Spaces

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

Standard

Non-Supramenable Groups Acting on Locally Compact Spaces. / Kellerhals, Julian; Monod, Nicolas; Rørdam, Mikael.

In: Documenta Mathematica, Vol. 18, 2013, p. 1597-1626.

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

Harvard

Kellerhals, J, Monod, N & Rørdam, M 2013, 'Non-Supramenable Groups Acting on Locally Compact Spaces', Documenta Mathematica, vol. 18, pp. 1597-1626.

APA

Kellerhals, J., Monod, N., & Rørdam, M. (2013). Non-Supramenable Groups Acting on Locally Compact Spaces. Documenta Mathematica, 18, 1597-1626.

Vancouver

Kellerhals J, Monod N, Rørdam M. Non-Supramenable Groups Acting on Locally Compact Spaces. Documenta Mathematica. 2013;18:1597-1626.

Author

Kellerhals, Julian ; Monod, Nicolas ; Rørdam, Mikael. / Non-Supramenable Groups Acting on Locally Compact Spaces. In: Documenta Mathematica. 2013 ; Vol. 18. pp. 1597-1626.

Bibtex

@article{691363cc52c14ff7917e0cd792172551,

title = "Non-Supramenable Groups Acting on Locally Compact Spaces",

abstract = "Supramenability of groups is characterised in terms of invariant measures on locally compact spaces. This opens the door to constructing interesting crossed product $C^*$-algebras for non-supramenable groups. In particular, stable Kirchberg algebras in the UCT class are constructed using crossed products for both amenable and non-amenable groups. ",

author = "Julian Kellerhals and Nicolas Monod and Mikael R{\o}rdam",

year = "2013",

language = "English",

volume = "18",

pages = "1597--1626",

journal = "Documenta Mathematica",

issn = "1431-0635",

publisher = "Deutsche Mathematiker Vereinigung",

}

RIS

TY - JOUR

T1 - Non-Supramenable Groups Acting on Locally Compact Spaces

AU - Kellerhals, Julian

AU - Monod, Nicolas

AU - Rørdam, Mikael

PY - 2013

Y1 - 2013

N2 - Supramenability of groups is characterised in terms of invariant measures on locally compact spaces. This opens the door to constructing interesting crossed product $C^*$-algebras for non-supramenable groups. In particular, stable Kirchberg algebras in the UCT class are constructed using crossed products for both amenable and non-amenable groups.

AB - Supramenability of groups is characterised in terms of invariant measures on locally compact spaces. This opens the door to constructing interesting crossed product $C^*$-algebras for non-supramenable groups. In particular, stable Kirchberg algebras in the UCT class are constructed using crossed products for both amenable and non-amenable groups.

M3 - Journal article

VL - 18

SP - 1597

EP - 1626

JO - Documenta Mathematica

JF - Documenta Mathematica

SN - 1431-0635

ER -

ID: 117489137