Ortho-isomorphisms of von Neumann algebras
Abstract
Suppose M and N are von Neumann algebras. Two operators A and B in M are said to be orthogonal if A*B=0, meaning their ranges are orthogonal. Let M N be a map. We say that is an ortho-isomorphism if it is bijective and satisfies that A*B=0 if and only if (A)*(B)=0 for all A,B∈ M. The map is called ortho-additive if the additive relation (A+B)=(A)+(B) holds for all A,B∈ M with A*B=0. In this paper, we characterize the complete structure of ortho-additive ortho-isomorphisms between von Neumann algebras, which is an analogue of Dye's theorem and Uhlhorn's theorem.
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