Hochschild cohomology of type II$_1$ von Neumann algebras with Property $\Gamma$

Junhao Shen

Hochschild cohomology of type II1 von Neumann algebras with Property

Abstract

In this paper, Property for a type II1 von Neumann algebra is introduced as a generalization of Murray and von Neumann's Property for a type II1 factor. The main result of this paper is that if a type II1 von Neumann algebra M with separable predual has Property , then the continuous Hochschild cohomology group Hk(M, M) vanishes for every k ≥ 2. This gives a generalization of an earlier result due to E. Christensen, F. Pop, A.M. Sinclair and R.R. Smith.

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