Generalized eigenvectors of linear operators and biorthogonal systems

Khats, R. V.

doi:10.33205/cma.1077842

Constructive Mathematical Analysis

2022

DOI: 10.33205/cma.1077842

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Generalized eigenvectors of linear operators and biorthogonal systems

R. V. Khats

Abstract: The notions of a set of generalized eigenvalues and a set of generalized eigenvectors of a linear operator in Euclidean space are introduced. In addition, we provide a method to find a biorthogonal system of a subsystem of eigenvectors of some linear operators in a Hilbert space whose systems of canonical eigenvectors are over-complete. Related to our problem, we will show an example of a linear differential operator that is formally adjoint to Bessel-type differential operators. We also investigate basis prop… Show more

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2023

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Cited by 2 publications

References 15 publications

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Completeness of the System of Generalized Eigenfunctions for a Bessel-Type Differential Operator

Khats’

2023

J Math Sci

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Completeness of the System of Generalized Eigenfunctions for a Bessel-Type Differential Operator

Khats’

2023

J Math Sci

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On the completeness of a system of Bessel functions of index −3/2 in weighted l2-space

Khats’

2023

Filomat

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In this paper, we study an integral representation of some class E2,+ of even entire functions of exponential type ? ? 1. We also obtain an analog of the Paley-Wiener theorem related to the class E2,+. In addition, we find necessary and sufficient conditions for the completeness of a system n sk ? xsk J?3/2(xsk) : k ? N o in the space L2((0; 1); x2dx), where J?3/2 be the Bessel function of the first kind of index ?3/2, (sk)k?N be a sequence of distinct nonzero complex numbers and L2((0; 1); x2dx) be the weighted Lebesgue space of all measurable functions f : (0; 1) ? C satisfying R 1 0 x2| f (x)|2 dx < +?. Those results are formulated in terms of sequences of zeros of functions from the class E2,+. We also obtain some other sufficient conditions for the completeness of the considered system of Bessel functions. Our results complement similar results on completeness of the systems of Bessel functions of index ? < ?1, ? ? Z.

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Generalized eigenvectors of linear operators and biorthogonal systems

Cited by 2 publications

References 15 publications

Completeness of the System of Generalized Eigenfunctions for a Bessel-Type Differential Operator

Completeness of the System of Generalized Eigenfunctions for a Bessel-Type Differential Operator

On the completeness of a system of Bessel functions of index −3/2 in weighted l2-space

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