Entire Isometric Operators in de Branges–Pontryagin Spaces and Truncated Trigonometric Moment Problem

We develop two functional models for closed isometric entire operators V with finite deficiency indices (p, p) acting in a separable Pontryagin space K. In the first functional model it is shown that every such operator V is unitarily equivalent to a restriction TE of the backward shift operator in...

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Vydané v:Complex analysis and operator theory Ročník 19; číslo 5; s. 108
Hlavní autori: Derkach, Volodymyr, Dym, Harry
Médium: Journal Article
Jazyk:English
Vydavateľské údaje: Heidelberg Springer Nature B.V 01.07.2025
Predmet:
Eigenvalues
Entire functions
Functionals
Operators
ISSN:1661-8254, 1661-8262
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Shrnutí:We develop two functional models for closed isometric entire operators V with finite deficiency indices (p, p) acting in a separable Pontryagin space K. In the first functional model it is shown that every such operator V is unitarily equivalent to a restriction TE of the backward shift operator in the de Branges-Pontryagin space B(E) of p×1 vector valued entire functions. The second functional model is used to parametrize a class of compressed coresolvents of extensions V~ of V in terms of the range of a linear fractional transformation that is associated with the model. These results are applied to obtain a description of the set of solutions of an indefinite truncated trigonometric moment problem.
Bibliografia:ObjectType-Article-1
SourceType-Scholarly Journals-1
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content type line 14
ISSN:1661-8254
1661-8262
DOI:10.1007/s11785-025-01729-z