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Stability of order and type under perturbation of the spectral measure. / Baranov, Anton; Woracek, Harald.

In: Revista Matematica Iberoamericana, Vol. 35, No. 4, 01.08.2019, p. 963-1026.

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Harvard

Baranov, A & Woracek, H 2019, 'Stability of order and type under perturbation of the spectral measure', Revista Matematica Iberoamericana, vol. 35, no. 4, pp. 963-1026. https://doi.org/10.4171/rmi/1076

APA

Baranov, A., & Woracek, H. (2019). Stability of order and type under perturbation of the spectral measure. Revista Matematica Iberoamericana, 35(4), 963-1026. https://doi.org/10.4171/rmi/1076

Vancouver

Baranov A, Woracek H. Stability of order and type under perturbation of the spectral measure. Revista Matematica Iberoamericana. 2019 Aug 1;35(4):963-1026. https://doi.org/10.4171/rmi/1076

Author

Baranov, Anton ; Woracek, Harald. / Stability of order and type under perturbation of the spectral measure. In: Revista Matematica Iberoamericana. 2019 ; Vol. 35, No. 4. pp. 963-1026.

BibTeX

@article{c3bc1defd9254dbbb37180b1ea74dbe5,
title = "Stability of order and type under perturbation of the spectral measure",
abstract = "It is known that the type of a measure is stable under perturbations consisting of exponentially small redistribution of mass and exponentially small additive summands. This fact can be seen as stability of de Branges chains in the corresponding L2-spaces. We investigate stability of de Branges chains in L2-spaces under perturbations having the same form, but allow other magnitudes for the error. The admissible size of a perturbation is connected with the maximal growth of functions in the chain and is measured by means of a growth function λ. The main result is a fast growth theorem. It states that an alternative takes place when passing to a perturbed measure: either the original de Branges chain remains dense, or its closure must contain functions with faster growth than λ. For the growth function λ(r) = r, i.e., exponentially small perturbations, the afore mentioned known fact is reobtained. We propose a notion of order of a measure and show stability and monotonicity properties of this notion. The cases of exponential type (order 1) and very slow growth (logarithmic order ≤ 2) turn out to be particular.",
keywords = "De Branges space, Growth function, Order and type of a measure, Perturbation of measures, Weighted approximation",
author = "Anton Baranov and Harald Woracek",
year = "2019",
month = aug,
day = "1",
doi = "10.4171/rmi/1076",
language = "English",
volume = "35",
pages = "963--1026",
journal = "Revista Matematica Iberoamericana",
issn = "0213-2230",
publisher = "Universidad Autonoma de Madrid",
number = "4",

}

RIS

TY - JOUR

T1 - Stability of order and type under perturbation of the spectral measure

AU - Baranov, Anton

AU - Woracek, Harald

PY - 2019/8/1

Y1 - 2019/8/1

N2 - It is known that the type of a measure is stable under perturbations consisting of exponentially small redistribution of mass and exponentially small additive summands. This fact can be seen as stability of de Branges chains in the corresponding L2-spaces. We investigate stability of de Branges chains in L2-spaces under perturbations having the same form, but allow other magnitudes for the error. The admissible size of a perturbation is connected with the maximal growth of functions in the chain and is measured by means of a growth function λ. The main result is a fast growth theorem. It states that an alternative takes place when passing to a perturbed measure: either the original de Branges chain remains dense, or its closure must contain functions with faster growth than λ. For the growth function λ(r) = r, i.e., exponentially small perturbations, the afore mentioned known fact is reobtained. We propose a notion of order of a measure and show stability and monotonicity properties of this notion. The cases of exponential type (order 1) and very slow growth (logarithmic order ≤ 2) turn out to be particular.

AB - It is known that the type of a measure is stable under perturbations consisting of exponentially small redistribution of mass and exponentially small additive summands. This fact can be seen as stability of de Branges chains in the corresponding L2-spaces. We investigate stability of de Branges chains in L2-spaces under perturbations having the same form, but allow other magnitudes for the error. The admissible size of a perturbation is connected with the maximal growth of functions in the chain and is measured by means of a growth function λ. The main result is a fast growth theorem. It states that an alternative takes place when passing to a perturbed measure: either the original de Branges chain remains dense, or its closure must contain functions with faster growth than λ. For the growth function λ(r) = r, i.e., exponentially small perturbations, the afore mentioned known fact is reobtained. We propose a notion of order of a measure and show stability and monotonicity properties of this notion. The cases of exponential type (order 1) and very slow growth (logarithmic order ≤ 2) turn out to be particular.

KW - De Branges space

KW - Growth function

KW - Order and type of a measure

KW - Perturbation of measures

KW - Weighted approximation

UR - http://www.scopus.com/inward/record.url?scp=85074570042&partnerID=8YFLogxK

U2 - 10.4171/rmi/1076

DO - 10.4171/rmi/1076

M3 - Article

AN - SCOPUS:85074570042

VL - 35

SP - 963

EP - 1026

JO - Revista Matematica Iberoamericana

JF - Revista Matematica Iberoamericana

SN - 0213-2230

IS - 4

ER -

ID: 51700552