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Organizers |
Exact groups and C*-algebras
by
Simon Wassermann
University of Glasgow
| EXACT GROUPS AND C*-ALGEBRAS |
In the mid-1970s it became clear that a commonly used
tensor product operation for C*-algebras can behave badly with
respect to taking quotients. If A and B are C*-algebras
faithfully represented on Hilbert spaces H and
K, then the completion of the image of the algebraic tensor
product A\odot B in L(H\otimesK) is the spatial
tensor product A\otimesB. If I is a (two-sided, closed) ideal
of B, so that the sequence
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Over the last twenty years it has become apparent that
the exact C*-algebras occupy a special position among all
C*-algebras. There has been spectacular progress in understanding
their structure, primarily as a result of the work of E. Kirchberg, one of whose most remarkable results is that a
separable C*-algebra is exact if and only if it is a C*-subalgebra
of a certain well-known simple C*-algebra, the Cuntz algebra
O2.
Recently, exact groups have attracted increasing
attention, partly in connection with work on the Novikov
conjecture. Kirchberg and the speaker have obtained various
characterisations of exact groups; for example, a discrete group
G is exact if and only if its regular C*-algebra C*r(G) is
an exact C*-algebra. It has been shown that a wide class of
locally compact groups, including most naturally occurring
examples, are exact. One of the most perplexing questions, whether
all discrete groups are exact, also appears to have been resolved
at last. In recent months Ozawa has given a characterisation of
group exactness which implies that certain groups whose
construction has been announced by Gromov are not exact.
This talk will describe some of these developments.
Date received: June 14, 2000
Copyright © 2000 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Conferences Inc. Document # caeo-67.