On a class of type II1 factors with Betti numbers invariants
成果类型:
Article
署名作者:
Popa, Sorin
刊物名称:
ANNALS OF MATHEMATICS
ISSN/ISSBN:
0003-486X
DOI:
10.4007/annals.2006.163.809
发表日期:
2006
页码:
809-899
关键词:
von-neumann-algebras
property-t
equivalence-relations
cartan subalgebras
CLASSIFICATION
subfactors
index
AUTOMORPHISMS
derivations
SEQUENCES
摘要:
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 HT of factors M having such Cartan subalgebras A subset of M, the Betti numbers of the standard eqilivalence relation associated with A subset of M ([G2]), are in fact isomorphism invariants for HT the factors M, beta n(HT) (M), n >= 0. The class HT is closed under amplifications and tensor products, with the Betti numbers satisfying beta(HT)(n) (M-t) = beta(HT)(n) (M)/t, for all t > 0, and a Kunneth type formula. An example of a factor in the class HT is given by the group von Neumann factor M = L(Z(2) x SL(2, Z)), for which beta(HT)(1)(M) = beta(1)(SL(2,Z)) = 1/12. Thus, M-t not similar or equal to M, for all t , 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.