$$\mathcal L(\Phi )$$ Spaces and Linear Fractional Transformations

Daniel Alpay; Fabrizio Colombo; Irene Sabadini

doi:10.1007/978-3-030-38312-1_9

$$\mathcal L(\Phi )$$ Spaces and Linear Fractional Transformations

Daniel Alpay
, Fabrizio Colombo
, Irene Sabadini

Research output: Chapter in Book/Report/Conference proceeding › Chapter › peer-review

Abstract

In the complex setting case (and in the related time-varying case), spaces and (and the related spaces) are closely related by linear fractional transformations; this originates with the works of de Branges, see [47] and of de Branges and Rovnyak [50]. In this section we outline the counterpart of such relations in the quaternionic setting.

Original language	English
Title of host publication	SpringerBriefs in Mathematics
Publisher	Springer Science and Business Media B.V.
Pages	87-92
Number of pages	6
DOIs	https://doi.org/10.1007/978-3-030-38312-1_9
State	Published - 1 Jan 2020
Externally published	Yes

Publication series

Name	SpringerBriefs in Mathematics
ISSN (Print)	2191-8198
ISSN (Electronic)	2191-8201

ASJC Scopus subject areas

General Mathematics

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10.1007/978-3-030-38312-1_9

Cite this

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abstract = "In the complex setting case (and in the related time-varying case), spaces and (and the related spaces) are closely related by linear fractional transformations; this originates with the works of de Branges, see [47] and of de Branges and Rovnyak [50]. In this section we outline the counterpart of such relations in the quaternionic setting.",

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AU - Colombo, Fabrizio

AU - Sabadini, Irene

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N2 - In the complex setting case (and in the related time-varying case), spaces and (and the related spaces) are closely related by linear fractional transformations; this originates with the works of de Branges, see [47] and of de Branges and Rovnyak [50]. In this section we outline the counterpart of such relations in the quaternionic setting.

AB - In the complex setting case (and in the related time-varying case), spaces and (and the related spaces) are closely related by linear fractional transformations; this originates with the works of de Branges, see [47] and of de Branges and Rovnyak [50]. In this section we outline the counterpart of such relations in the quaternionic setting.

UR - https://www.scopus.com/pages/publications/85101172685

U2 - 10.1007/978-3-030-38312-1_9

DO - 10.1007/978-3-030-38312-1_9

M3 - Chapter

AN - SCOPUS:85101172685

T3 - SpringerBriefs in Mathematics

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BT - SpringerBriefs in Mathematics

PB - Springer Science and Business Media B.V.

ER -

$$\mathcal L(\Phi )$$ Spaces and Linear Fractional Transformations

Abstract

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