Decompositions of locally compact contraction groups, series and extensions

Glöckner, Helge; Willis, George A.

Title: Decompositions of locally compact contraction groups, series and extensions
Creator: Glöckner, Helge; Willis, George A.
Relation: Journal of Algebra Vol. 570, Issue 15 March 2021, p. 164-214
Publisher Link: http://dx.doi.org/10.1016/j.jalgebra.2020.11.007
Publisher: Academic Press
Resource Type: journal article
Date: 2021
Description: A locally compact contraction group is a pair (G, α), where G is a locally compact group and α:G →G an automorphism such that αⁿ(x) →e pointwise as n →∞. We show that every surjective, continuous, equivariant homomorphism between locally compact contraction groups admits an equivariant continuous global section. As a consequence, extensions of locally compact contraction groups with abelian kernel can be described by continuous equivariant cohomology. For each prime number p, we use 2-cocycles to construct uncountably many pairwise non-isomorphic totally disconnected, locally compact contraction groups (G, α)which are central extensions{0}→F_p((t))→G→F_p((t))→{0}of the additive group of the field of formal Laurent series over F_p=Z/pZby itself. By contrast, there are only countably many locally compact contraction groups (up to isomorphism) which are torsion groups and abelian, as follows from a classification of the abelian locally compact contraction groups.
Subject: contraction group; Torsion group; extension; cocycle; section; equivariant cohomology; Abelian group; Nilpotent group; isomorphism types
Identifier: http://hdl.handle.net/1959.13/1425662
Identifier: uon:38290
Identifier: ISSN:0021-8693
Language: eng
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