Almost almost periodic type III1 factors and their 3-cohomology obstructions
Abstract
We construct an exemple of a full factor M such that its canonical outer modular flow σM : R → Out(M) is almost periodic but M has no almost periodic state. This can only happen if the discrete spectrum of σM contains a nontrivial integral quadratic relation. We show how such a nontrivial relation can produce a 3-cohomological obstruction to the existence of an almost periodic state. To obtain our main theorem, we first strengthen a recent result of Bischoff and Karmakar by showing that for any compact connected abelian group K, every cohomology class in H3(K,T) can be realized as an obstruction of a K-kernel on the hyperfinite II1 factor. We also prove a positive result : if for a full factor M the outer modular flow σM : R → Out(M) is almost periodic, then M R has an almost periodic state, where R is the hyperfinite II1 factor. Finally, we prove a positive result for crossed product factors associated to strongly ergodic actions of hyperbolic groups.
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