Values of the Pukanszky invariant in free group factors and the hyperfinite factor

Abstract

Let A be a maximal abelian self-adjoint subalgebra (masa) in a type II1 factor M acting via standard representation on L2(M). The abelian von Neumann algebra A generated by A and JAJ has a type I commutant which contains the projection eA from L2(M) onto L2(A). Then A'(1-eA) decomposes into a direct sum of type In algebras for n in 1,2,...,∞, and those n's which occur in the direct sum form a set called the Pukanszky invariant, Puk(A), also denoted PukM(A) when the containing factor is ambiguous. In this paper we show that this invariant can take on the values S ∞ when M is both a free group factor and the hyperfinite factor, and where S is an arbitrary subset of the natural numbers. The only previously known values for masas in free group factors were ∞ and 1,∞, and some values of the form S ∞ are new also for the hyperfinite factor. We also consider a more refined invariant (that we will call the measure-multiplicity invariant), which was considered recently by Neshveyev and Stormer and has been known to experts for a long time. We use the measure-multiplicity invariant to distinguish two masas in a free group factor, both having Pukanszky invariant n,∞, for an arbitrary natural number n.

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