The linear 2()-action on n: ergodic and von Neumann algebraic aspects

Abstract

The unique irreducible representation of 2() on n induces an action, called the linear action, of 2() on the torus n for every n≥ 2. For n odd, it factors through 2(), so we denote by Gn the group 2() for n even, and 2() for n odd. We prove that the action is free and ergodic for every n≥ 2, that if h∈ 2() is a hyperbolic element and if n is even, then the action of the subgroup generated by h is still ergodic, but also that, for n odd, no amenable subgroup of 2() acts ergodically on n. We deduce also that every ergodic sub-equivalence relation of the orbital equivalence relation Sn of Gn on n is either amenable or rigid, extending a result by Ioana for n=2. This result has the following corollaries: firstly, for n≥ 2 even, if H is a maximal amenable subgroup of 2() containing an hyperbolic matrix, then the associated crossed product II1 factor L∞(n) H is a maximal Haagerup subalgebra of L∞(n) 2(); secondly , for every n, the fundamental group of L∞(n) Gn is trivial.

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