Journal of Lie Theory EMIS ELibM Electronic Journals Journal of Lie Theory
Vol. 14, No. 1, pp. 199--213 (2004)

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$H^4(BK,Z)$ and Operator Algebras

Doug Pickrell

Doug Pickrell
Department of Mathematics
University of Arizona
Tucson, Arizona, 85721 (USA)
Pickrell@math.arizona.edu

Abstract: There is a well-known interpretation of group cohomology in terms of (generalized) group extensions. For a connected semisimple compact Lie group $K$, we prove that the extensions corresponding to classes in $H^4(BK,\Z)$ can be interpreted in terms of automorphisms of a pair consisting of a type $II_1$ von Neumann algebra and a Cartan subalgebra.

Classification (MSC2000): 20J06; 46L10

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