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$C^\ast$-simple groups without free subgroups

Published 2014-01-28, updated 2014-06-24Version 3

We construct first examples of non-trivial groups without non-cyclic free subgroups whose reduced $C^\ast$-algebra is simple and has unique trace. This answers a question of de la Harpe. Both torsion and torsion free examples are provided. In particular, we show that the reduced $C^\ast$-algebra of the free Burnside group $B(m,n)$ of rank $m\ge 2$ and any sufficiently large odd exponent $n$ is simple and has unique trace.

Categories: math.GR, math.OA

Subjects: 20F06, 20F67, 22D25, 47L05

Keywords: simple groups, unique trace, non-cyclic free subgroups, torsion free examples, free burnside group

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$C^\ast$-simple groups without free subgroups

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$C^\ast$-simple groups without free subgroups

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