Title of article
Building suitable sets for locally compact groups by means of continuous selections
Author/Authors
Shakhmatov، نويسنده , , Dmitri، نويسنده ,
Issue Information
دوماهنامه با شماره پیاپی سال 2009
Pages
8
From page
1216
To page
1223
Abstract
If a discrete subset S of a topological group G with the identity 1 generates a dense subgroup of G and S ∪ { 1 } is closed in G, then S is called a suitable set for G. We apply Michaelʹs selection theorem to offer a direct, self-contained, purely topological proof of the result of Hofmann and Morris [K.-H. Hofmann, S.A. Morris, Weight and c, J. Pure Appl. Algebra 68 (1–2) (1990) 181–194] on the existence of suitable sets in locally compact groups. Our approach uses only elementary facts from (topological) group theory.
Keywords
Locally compact group , Generating rank , Lower semicontinuous , Suitable set , Set-valued map , Selection , Converging sequence , Compactly generated
Journal title
Topology and its Applications
Serial Year
2009
Journal title
Topology and its Applications
Record number
1581973
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