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Amenable Groups and Invariant Means

✍ Scribed by M. Foreman

Publisher
Elsevier Science
Year
1994
Tongue
English
Weight
778 KB
Volume
126
Category
Article
ISSN
0022-1236

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✦ Synopsis

Banach showed in 1923 that Lebesgue measure is not the unique rotation invariant finitely additive probability measure on the measurable subsets of (S^{1}). Margulis and Sullivan (for (n \geqslant 4) ) and Drinfield (for (n=2,3) ) independently showed that Lebesgue measure is the unique isometry invariant finitely additive probability measure on (S^{n}). These results all used special properties of the group action. Rosenblatt asked whether an amenable group can uniquely determine an invariant mean. Using techniques from set theory we obtain information on this question and give a complete solution in the case of locally finite groups acting on the integers.
C) 1994 Academic Press, Inc.

πŸ“œ SIMILAR VOLUMES

Amenable Groups and Generalized Cuntz Al
Amenable Groups and Generalized Cuntz Algebras
✍ Marco Aita; Wolfgang R. Bergmann; Roberto Conti πŸ“‚ Article πŸ“… 1997 πŸ› Elsevier Science 🌐 English βš– 410 KB

With H a Hilbert space, O H the generalized Cuntz algebra over H endowed with the canonical action 4 of U(H), we consider a natural family S 0 of product representations of the zero grade part O 0 H , and the family S obtained from S 0 by inducing to O H via the natural conditional expectation P: O