Murray-von Neumann dimension for strictly semifinite weights

Abstract

Given a von Neumann algebra M equipped with a faithful normal strictly semifinite weight , we develop a notion of Murray-von Neumann dimension over (M,) that is defined for modules over the basic construction associated to the inclusion M ⊂ M. For =τ a faithful normal tracial state, this recovers the usual Murray-von Neumann dimension for finite von Neumann algebras. If M is either a type IIIλ factor with 0<λ <1 or a full type III1 factor with Sd(M)≠ R, then amongst extremal almost periodic weights the dimension function depends on only up to scaling. As an application, we show that if an inclusion of diffuse factors with separable preduals N⊂ M is with expectation E and admits a compatible extremal almost periodic state , then this dimension quantity bounds the index IndE, and in fact equals it when the modular operators and |N have the same point spectrum. In the pursuit of this result, we also show such inclusions always admit Pimsner-Popa orthogonal bases.

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