The outer spectral radius and dynamics of completely positive maps

Pascoe, J. E.

doi:10.48550/arxiv.1905.09895

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Regularity Of Nc Rational Functions In Fock Space1

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2020

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“…The map ℓ → − → ℓ has many nice properties, see e.g. [16, Section 3] and [17]. In particular, if we have a linear pencil…”

Section: Regularity Of Nc Rational Functions In Fock Spacementioning

confidence: 99%

Non-commutative rational functions in the full Fock space

Jury¹,

W.²,

Shamovich³

2020

Preprint

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A rational function belongs to the Hardy space, H 2 , of square-summable power series if and only if it is bounded in the complex unit disk. Any such rational function is necessarily analytic in a disk of radius greater than one. The inner-outer factorization of a rational function, r ∈ H 2 is particularly simple: The inner factor of r is a (finite) Blaschke product and (hence) both the inner and outer factors are again rational.We extend these and other basic facts on rational functions in H 2 to the full Fock space over C d , identified as the non-commutative (NC) Hardy space of square-summable power series in several NC variables. In particular, we characterize when an NC rational function belongs to the Fock space, we prove analogues of classical results for inner-outer factorizations of NC rational functions and NC polynomials, and we obtain spectral results for NC rational multipliers.

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“…The map ℓ → − → ℓ has many nice properties, see e.g. [16, Section 3] and [17]. In particular, if we have a linear pencil…”

Section: Regularity Of Nc Rational Functions In Fock Spacementioning

confidence: 99%