Linear Fractional Transformations of Nevanlinna Functions Associated with a Nonnegative Operator

Jussi Behrndt; Seppo Hassi; Henk de Snoo; Rudi Wietsma; Henrik Winkler

doi:10.1007/s11785-011-0197-3

Linear Fractional Transformations of Nevanlinna Functions Associated with a Nonnegative Operator

Jussi Behrndt, Seppo Hassi, Henk de Snoo^*, Rudi Wietsma, Henrik Winkler

^*Corresponding author for this work

Research output: Contribution to journal › Article › Academic › peer-review

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Abstract

In the present paper a subclass of scalar Nevanlinna functions is studied, which coincides with the class of Weyl functions associated to a nonnegative symmetric operator of defect one in a Hilbert space. This class consists of all Nevanlinna functions that are holomorphic on (-a, 0) and all those Nevanlinna functions that have one negative pole a and are injective on . These functions are characterized via integral representations and special attention is paid to linear fractional transformations which arise in extension and spectral problems of symmetric and selfadjoint operators.

Original language	English
Pages (from-to)	331-362
Number of pages	32
Journal	Complex analysis and operator theory
Volume	7
Issue number	2
DOIs	https://doi.org/10.1007/s11785-011-0197-3
Publication status	Published - Apr-2013

Keywords

BOUNDARY-VALUE-PROBLEMS
EXTENSION

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title = "Linear Fractional Transformations of Nevanlinna Functions Associated with a Nonnegative Operator",

abstract = "In the present paper a subclass of scalar Nevanlinna functions is studied, which coincides with the class of Weyl functions associated to a nonnegative symmetric operator of defect one in a Hilbert space. This class consists of all Nevanlinna functions that are holomorphic on (-a, 0) and all those Nevanlinna functions that have one negative pole a and are injective on . These functions are characterized via integral representations and special attention is paid to linear fractional transformations which arise in extension and spectral problems of symmetric and selfadjoint operators.",

keywords = "BOUNDARY-VALUE-PROBLEMS, EXTENSION",

author = "Jussi Behrndt and Seppo Hassi and {de Snoo}, Henk and Rudi Wietsma and Henrik Winkler",

note = "Relation: http://www.rug.nl/research/jbi/ Rights: University of Groningen, Johann Bernoulli Institute for Mathematics and Computer Science",

year = "2013",

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AU - Behrndt, Jussi

AU - Hassi, Seppo

AU - de Snoo, Henk

AU - Wietsma, Rudi

AU - Winkler, Henrik

N1 - Relation: http://www.rug.nl/research/jbi/ Rights: University of Groningen, Johann Bernoulli Institute for Mathematics and Computer Science

PY - 2013/4

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N2 - In the present paper a subclass of scalar Nevanlinna functions is studied, which coincides with the class of Weyl functions associated to a nonnegative symmetric operator of defect one in a Hilbert space. This class consists of all Nevanlinna functions that are holomorphic on (-a, 0) and all those Nevanlinna functions that have one negative pole a and are injective on . These functions are characterized via integral representations and special attention is paid to linear fractional transformations which arise in extension and spectral problems of symmetric and selfadjoint operators.

AB - In the present paper a subclass of scalar Nevanlinna functions is studied, which coincides with the class of Weyl functions associated to a nonnegative symmetric operator of defect one in a Hilbert space. This class consists of all Nevanlinna functions that are holomorphic on (-a, 0) and all those Nevanlinna functions that have one negative pole a and are injective on . These functions are characterized via integral representations and special attention is paid to linear fractional transformations which arise in extension and spectral problems of symmetric and selfadjoint operators.

KW - BOUNDARY-VALUE-PROBLEMS

KW - EXTENSION

U2 - 10.1007/s11785-011-0197-3

DO - 10.1007/s11785-011-0197-3

M3 - Article

SN - 1661-8254

VL - 7

SP - 331

EP - 362

JO - Complex analysis and operator theory

JF - Complex analysis and operator theory

IS - 2

ER -

Linear Fractional Transformations of Nevanlinna Functions Associated with a Nonnegative Operator

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