On a Class of Type II1 Factors with Betti Numbers Invariants
Abstract
We prove that a type II1 factor M can have at most one Cartan subalgebra A satisfying a combination of rigidity and compact approximation properties. We use this result to show that within the class H T of factors M having such Cartan subalgebras A ⊂ M, the Betti numbers of the standard equivalence relation associated with A ⊂ M ([G2]), are in fact isomorphism invariants for the factors M, β^HTn(M), n≥ 0. The class H T is closed under amplifications and tensor products, with the Betti numbers satisfying β^HTn(Mt)= β^HTn(M)/t, ∀ t>0, and a K\"unneth type formula. An example of a factor in the class H T is given by the group von Neumann factor M=L( Z2 SL(2, Z)), for which β^HT1(M) = β1(SL(2, Z)) = 1/12. Thus, Mt M, ∀ t ≠ 1, showing that the fundamental group of M is trivial. This solves a long standing problem of R.V. Kadison. Also, our results bring some insight into a recent problem of A. Connes and answer a number of open questions on von Neumann algebras.
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