Algebraic aspects and functoriality of the set of affiliated operators

Abstract

In this article, we aim to provide a satisfactory algebraic description of the set of affiliated operators for von Neumann algebras. Let M be a von Neumann algebra acting on a Hilbert space H, and let Maff denote the set of unbounded operators of the form T = AB for A, B ∈ M with (B)⊂eq(A) , where (·) denotes the Kaufman inverse. We show that Maff is closed under product, sum, Kaufman-inverse and adjoint, and has the structure of a right near-semiring; Moreover, the above quotient representation of an operator in Maff is essentially unique. The Murray-von Neumann affiliated operators for M turn out to be precisely the closed operators in Maff. Let be a unital normal homomorphism between represented von Neumann algebras (M; H) and (N; K). With the help of the quotient representation, we obtain a canonical extension of to a mapping aff : Maff Naff which respects sum, product, Kaufman-inverse, and adjoint. Thus Maff is intrinsically associated with M and transforms functorially as we change representations of M. Furthermore, aff preserves operator properties such as being symmetric, or positive, or accretive, or sectorial, or self-adjoint, or normal, and also preserves the Friedrichs and Krein-von Neumann extensions of densely-defined closed positive operators. As a proof of concept, we transfer some well-known results about closed unbounded operators to the setting of closed affiliated operators for properly infinite von Neumann algebras, via `abstract nonsense'.

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