An Introduction to Hyperholomorphic Spectral Theories and Fractional Powers of Vector Operators

Colombo, Fabrizio; Gantner, Jonathan; Pinton, Stefano

doi:10.1007/s00006-021-01148-1

Cited by 9 publications

(1 citation statement)

References 86 publications

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“…Over the recent years, the spectral theory for quaternionic operators has piqued the interest and attracted the attention of multiple researchers, see for instance [1,4,12,13,14,15,16,17,29] and references therein. Research in this topic is motivated by application in various fields, including quantum mechanics, fractional evolution problems [14], and quaternionic Schur analysis [3].…”

Section: Introductionmentioning

confidence: 99%

Riesz projection and essential $S$-spectrum in quaternionic setting

Baloudi¹,

Belgacem²,

Jeribi³

2021

Preprint

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This paper is devoted to the investigation of the Weyl and the essential S−spectra of a bounded right quaternionic linear operator in a right quaternionic Hilbert space. Using the quaternionic Riesz projection, the S−eigenvalue of finite type is both introduced and studied.In particular, we have shown that the Weyl and the essential S−spectra do not contain eigenvalues of finite type. We have also described the boundary of the Weyl S−spectrum and the particular case of the spectral theorem of the essential S−spectrum. Contents 1. Introduction 1 2. Mathematical preliminaries 3 2.1. Quaternions 3 2.2. Right quaternionic Hilbert space and operator 4 2.3. The quaternionic functional calculus 7 3. Riesz projection and essential spectrum 9 4. Some results on the Weyl S-spectrum 18 References 22

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Section: Introductionmentioning

confidence: 99%

Riesz projection and essential $S$-spectrum in quaternionic setting

Baloudi¹,

Belgacem²,

Jeribi³

2021

Preprint

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Function Spaces and Spectral Theories

Alpay,

Colombo,

Sabadini

2024

Operator Theory: Advances and Applications

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Riesz Projection and Essential S-spectrum in Quaternionic Setting

Baloudi

Belgacem

Jeribi

2022

Complex Anal. Oper. Theory

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This paper is devoted to the study of the S-eigenvalue of finite type of a bounded right quaternionic linear operator acting in a right quaternionic Hilbert space. The study is based on the different properties of the Riesz projection associated with the connected part of the S-spectrum. Furthermore, we introduce the left and right Browder Sresolvent operators. Inspired by the S-resolvent equation, we give the Browder's S-resolvent equation in quaternionic setting. Contents 1. Introduction 1 2. Mathematical preliminaries 4 2.1. Quaternions 4 2.2. Operators acting on right quaternionic Hilbert space 5 2.3. The quaternionic functional calculus 6 3. Eigenvalue of finite type 9 4. Browder S-resolvent equation in quaternionic setting 17 References 22

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An Introduction to Hyperholomorphic Spectral Theories and Fractional Powers of Vector Operators

Cited by 9 publications

References 86 publications

Riesz projection and essential $S$-spectrum in quaternionic setting

Riesz projection and essential $S$-spectrum in quaternionic setting

Function Spaces and Spectral Theories

Riesz Projection and Essential S-spectrum in Quaternionic Setting

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