Structure of derivations on various algebras of measurable operators for type I von Neumann algebras
Sergio AlbeverioInstitut für Angewandte Mathematik, Universität Bonn, Wegelerstr. 6, D-53115 Bonn GermanySh. A. AyupovInstitute of Mathematics and Information Technologies, Uzbekistan Academy of Sciences, F. Hodjaev str. 29, 100125 Tashkent, UzbekistanKarimbergen KudaybergenovKarakalpak State University, Ch. Abdirov str. 1, 742012 Nukus, Uzbekistan
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Abstract
Given a von Neumann algebra $M$ denote by $S(M)$ and $LS(M)$ respectively the algebras of all measurable and locally measurable operators affiliated with $M.$ For a faithful normal semi-finite trace $τ$ on $M$ let $S(M, τ)$ (resp. $S_0(M, τ)$) be the algebra of all $τ$-measurable (resp. $τ$-compact) operators from $S(M).$ We give a complete description of all derivations on the above algebras of operators in the case of type I von Neumann algebra $M.$ In particular, we prove that if $M$ is of type I$_\infty$ then every derivation on $LS(M)$ (resp. $S(M)$ and $S(M,τ)$) is inner, and each derivation on $S_0(M, τ)$ is spatial and implemented by an element from $S(M, τ).$
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