Dilations of semigroups on von Neumann algebras and noncommutative \(L^{p}\)-spaces

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DOI10.1016/j.jfa.2018.11.013OpenAlexW2962912305WikidataQ128848929 ScholiaQ128848929MaRDI QIDQ1727408

Cédric Arhancet

Publication date: 20 February 2019

Published in: Journal of Functional Analysis (Search for Journal in Brave)

Full work available at URL: https://arxiv.org/abs/1603.04901

zbMATH Keywords

Markov semigroups von Neumann algebras dilations functional calculus

Mathematics Subject Classification ID

Markov semigroups and applications to diffusion processes (47D07) Groups and semigroups of linear operators (47D03) Noncommutative measure and integration (46L51) Dilations, extensions, compressions of linear operators (47A20)

Related Items (6)

On multivariate Matsaev's conjecture ⋮ Maximal ergodic inequalities for some positive operators on noncommutative Lp$L_p$‐spaces ⋮ A characterization of absolutely dilatable Schur multipliers ⋮ A noncommutative generalisation of a problem of Steinhaus ⋮ Dilations of Markovian semigroups of Fourier multipliers on locally compact groups ⋮ Markov dilations of semigroups of Fourier multipliers

Cites Work

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