A new characterization of topologically amenable groups
A countable group G is called topologically amenable if there exist a compact Hausdorff space X on which G acts by homeomorphisms and weak*-continuous maps b n from X to the space, prob (G), of probability measures on G such that for every g ∈ G, limn→infinity supx∈X g...
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University of Ottawa (Canada)
2013
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ndltd-uottawa.ca-oai-ruor.uottawa.ca-10393-274382018-01-05T19:07:32Z A new characterization of topologically amenable groups Al-Gadid, Yousef Mathematics. A countable group G is called topologically amenable if there exist a compact Hausdorff space X on which G acts by homeomorphisms and weak*-continuous maps b n from X to the space, prob (G), of probability measures on G such that for every g ∈ G, limn→infinity supx∈X gbnx-bn gx1=0. For example, every amenable group is topologically amenable but not vice versa: The free group F2 is topologically amenable without being amenable. Inspired by a characterization of amenable groups due to Giordano and de la Harpe (a countable group G is amenable if and only if every continuous action of G on the Cantor set C admits an invariant probability measure), we give a new characterization of topologically amenable groups: A countable group G is topologically amenable if and only if it admits an amenable action on the Cantor set C. 2013-11-07T18:14:12Z 2013-11-07T18:14:12Z 2007 2007 Thesis Source: Masters Abstracts International, Volume: 46-03, page: 1533. http://hdl.handle.net/10393/27438 http://dx.doi.org/10.20381/ruor-12084 en 63 p. University of Ottawa (Canada) |
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NDLTD |
| language |
en |
| format |
Others
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NDLTD |
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Mathematics. |
| spellingShingle |
Mathematics. Al-Gadid, Yousef A new characterization of topologically amenable groups |
| description |
A countable group G is called topologically amenable if there exist a compact Hausdorff space X on which G acts by homeomorphisms and weak*-continuous maps b n from X to the space, prob (G), of probability measures on G such that for every g ∈ G, limn→infinity supx∈X gbnx-bn gx1=0. For example, every amenable group is topologically amenable but not vice versa: The free group F2 is topologically amenable without being amenable.
Inspired by a characterization of amenable groups due to Giordano and de la Harpe (a countable group G is amenable if and only if every continuous action of G on the Cantor set C admits an invariant probability measure), we give a new characterization of topologically amenable groups: A countable group G is topologically amenable if and only if it admits an amenable action on the Cantor set C. |
| author |
Al-Gadid, Yousef |
| author_facet |
Al-Gadid, Yousef |
| author_sort |
Al-Gadid, Yousef |
| title |
A new characterization of topologically amenable groups |
| title_short |
A new characterization of topologically amenable groups |
| title_full |
A new characterization of topologically amenable groups |
| title_fullStr |
A new characterization of topologically amenable groups |
| title_full_unstemmed |
A new characterization of topologically amenable groups |
| title_sort |
new characterization of topologically amenable groups |
| publisher |
University of Ottawa (Canada) |
| publishDate |
2013 |
| url |
http://hdl.handle.net/10393/27438 http://dx.doi.org/10.20381/ruor-12084 |
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AT algadidyousef anewcharacterizationoftopologicallyamenablegroups AT algadidyousef newcharacterizationoftopologicallyamenablegroups |
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