We consider group measure space II$_1$ factors $M=L^{\infty}(X)\rtimes\Gamma$
arising from Bernoulli actions of ICC property (T) groups $\Gamma$ (more
generally, of groups $\Gamma$ containing an infinite normal subgroup with
relative property (T)) and prove a rigidity result for *--homomorphisms
$\theta:M\to M\bar{\otimes}M$. We deduce that the action
$\Gamma\curvearrowright X$ is W$^*$--superrigid. This means that if
$\Lambda\curvearrowright Y$ is {\bf any other} free, ergodic, measure
preserving action such that the factors $M=L^{\infty}(X)\rtimes\Gamma$ and
$L^{\infty}(Y)\rtimes\Lambda$ are isomorphic, then the actions
$\Gamma\curvearrowright X$ and $\Lambda\curvearrowright Y$ must be conjugate.
Moreover, we show that if $p\in M\setminus\{1\}$ is a projection, then $pMp$
does not admit a group measure space decomposition nor a group von Neumann
algebra decomposition (the latter under the additional assumption that $\Gamma$
is torsion free).
  We also prove a rigidity result for *--homomorphisms $\theta:M\to M$, this
time for $\Gamma$ in a larger class of groups than above, now including
products of non--amenable groups. For certain groups $\Gamma$, e.g.
$\Gamma=\Bbb F_2\times\Bbb F_2$, we deduce that $M$ does not embed in $pMp$,
for any projection $p\in M\setminus\{1\}$, and obtain a description of the
endomorphism semigroup of $M$.Comment: The revised version includes a new application: examples of II_1
  factors which are not isomorphic to twisted group von Neumann algebra

Ioana, Adrian

English

arXiv

We consider group measure space ∥_1 factors M = L^(∞)(X) ⋊ Γ arising from Bernoulli actions of ICC property (T) groups Γ (more generally, of groups Γ containing an infinite normal subgroup with the relative property (T)) and prove a rigidity result for *-homomorphisms Θ: → M⊗(overbar)M

We deduce that the action Γ ↷ X is W^*-superrigid, i.e. if Γ ↷ Y is any free, ergodic, measure preserving action such that the factors M = L^(∞)(X) ⋊ Γ and M =L^(∞)(Y) ⋊ Γ are isomorphic, then the actions Γ ↷ X and Γ ↷ Y must be conjugate.



Moreover, we show that if p ∈ M\{1} is a projection, then pMp does not admit a group measure space decomposition nor a group von Neumann algebra decomposition (the latter under the additional assumption that Γ is torsion free).



We also prove a rigidity result for *-homomorphisms Θ: M → M this time for Γ in a larger class of groups than above, now including products of non-amenable groups. For certain groups Γ, e.g. Γ = F_2 × F_2 we deduce that M does not embed into pMp, for any projection p ∈ M\{1}, and obtain a description of the endomorphism semigroup of M

Caltech Authors - Main

W*-superrigidity for Bernoulli actions of property (T) groups

Caltech Authors

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W*-superrigidity for Bernoulli actions of property (T) groups

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