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Non-existence of translation-invariant derivations on algebras of measurable functions

A. F. BerDepartment of Mathematics, National University of Uzbekistan, Vuzgorodok, 100174, Tashkent, UzbekistanJinghao HuangSchool of Mathematics and Statistics, University of New South Wales, Kensington, 2052, AustraliaKarimbergen KudaybergenovDepartment of Mathematics, Karakalpak State University, Ch. Abdirov 1, Nukus 230113, UzbekistanFedor SukochevSchool of Mathematics and Statistics, University of New South Wales, Kensington, 2052, Australia
Quaestiones Mathematicaejournal2022en
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Let S(0,1) be the *-algebra of all classes of Lebesgue measurable functions on the unit interval (0,1) and let be a complete symmetric Δ-normed *-subalgebra of S(0,1), in which simple functions are dense, e.g., L∞(0,1), Llog(0,1), S(0,1) and the Arens algebra Lω(0,1) equipped with their natural Δ-norms. We show that there exists no non-trivial derivation commuting with all dyadic translations of the unit interval. Let be a type II (or I∞) von Neumann algebra, be an arbitrary abelian von Neumann subalgebra of , let be the algebra of all measurable operators affiliated with . We show that there exists no non-trivial derivation which admits an extension to a derivation on . In particular, we answer an untreated question in [8].

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