The Spectral Analysis of a System of First-Order Equations With Dissipative Boundary Conditions
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Date
2021
Authors
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Publisher
Wiley
Open Access Color
Green Open Access
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Abstract
This paper aims to share some completeness theorems related with a boundary value problem generated by a system of equations and non-self-adjoint (dissipative) boundary conditions. Indeed, we consider a system of equations that contains a continuous analogous of the orthogonal polynomials on the unit circle. Constructing the characteristic function of the related dissipative operator, we share some completeness theorems. Moreover, we give an explicit form of the self-adjoint dilation of the dissipative operator.
Description
Ugurlu, Ekin/0000-0002-0540-8545
ORCID
Keywords
Completeness Theorem, Dissipative Operator, Orthogonal Polynomials On The Unit Circle, dissipative operator, orthogonal polynomials on the unit circle, Linear accretive operators, dissipative operators, etc., Orthogonal functions and polynomials, general theory of nontrigonometric harmonic analysis, completeness theorem, Eigenfunctions, eigenfunction expansions, completeness of eigenfunctions of ordinary differential operators
Fields of Science
0101 mathematics, 01 natural sciences
Citation
Uğurlu, Ekin (2021). "The spectral analysis of a system of first-order equations with dissipative boundary conditions", Mathematical Methods in the Applied Sciences, Vol. 44, no. 14, pp. 11046-11058.
WoS Q
Q1
Scopus Q
Q1
OpenCitations Citation Count
N/A
Source
Mathematical Methods in the Applied Sciences
Volume
44
Issue
14
Start Page
11046
End Page
11058
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Citations
Scopus : 1
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1
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1
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3
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