A Markov dilation for self-adjoint Schur multipliers

Ricard, Éric

doi:10.1090/s0002-9939-08-09452-5

Cited by 34 publications

(41 citation statements)

References 15 publications

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“…In what follows, this fact, together with Theorem 2.5 allows us to interpolate between respective BMO−space and L 2 −space. The crucial part of the argument is similar to that of Ricard [Ric08]. Proof.…”

Section: Markov Dilations For Semi-groups Of Double Operator Integralsmentioning

confidence: 83%

BMO-estimates for non-commutative vector valued Lipschitz functions

Caspers

Junge

Sukochev

et al. 2020

Journal of Functional Analysis

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We construct Markov semi-groups T and associated BMO-spaces on a finite von Neumann algebra (M, τ ) and obtain results for perturbations of commutators and non-commutative Lipschitz estimates. In particular, we prove that for any A ∈ M self-adjoint and f :We obtain an analogue of this result for more general von Neumann valuedfunctions f : R n → N by imposing Hörmander-Mikhlin type assumptions on f .In establishing these result we show that Markov dilations of Markov semigroups have certain automatic continuity properties. We also show that Markov semi-groups of double operator integrals admit (standard and reversed) Markov dilations.

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Section: Markov Dilations For Semi-groups Of Double Operator Integralsmentioning

confidence: 83%

BMO-estimates for non-commutative vector valued Lipschitz functions

Caspers

Junge

Sukochev

et al. 2020

Journal of Functional Analysis

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“…In this Section we show that the radial semi-group on free Araki-Woods factors has a good reversed Markov dilation. The first step in the proof of Proposition 5.10 is due to Ricard (see the final remarks of [Ric08]). We need to find a suitable analogue for semi-groups which we do by an ultraproduct argument.…”

Section: 3mentioning

confidence: 99%

Harmonic analysis and BMO-spaces of free Araki--Woods factors

Caspers

2019

Studia Math.

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“…The question of whether the closure of the set of matrix factorizable correlation matrices is the same as the set of factorizable correlation matrices is equivalent to Connes' embedding conjecture [7]. One wide class of Schur product channels that are known to be factorizable is the set of Schur product channels arising from correlation matrices with all real entries [5] [3]. Such a channel always admits a factorization by means of trace-orthogonal, anti-commuting unitaries.…”

Section: Example 6 (Discrete Fourier Transform)mentioning

confidence: 99%

Matrix N-dilations of quantum channels

Levick¹,

W.²

2018

Operators and Matrices

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We study unital quantum channels which are obtained via partial trace of a * -automorphism of a finite unital matrix * -algebra. We prove that any such channel, q, on a unital matrix * -algebra, A, admits a finite matrix N −dilation, αN , for any N ∈ N. Namely, αN is a * -automorphism of a larger bi-partite matrix algebra A ⊗ B so that partial trace of M -fold self-compositions of αN yield the M -fold self-compositions of the original quantum channel, for any 1 ≤ M ≤ N . This demonstrates that repeated applications of the channel can be viewed as * -automorphic time evolution of a larger finite quantum system.

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A Markov dilation for self-adjoint Schur multipliers

Cited by 34 publications

References 15 publications

BMO-estimates for non-commutative vector valued Lipschitz functions

BMO-estimates for non-commutative vector valued Lipschitz functions

Harmonic analysis and BMO-spaces of free Araki--Woods factors

Matrix N-dilations of quantum channels

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