Self-adjointness of unbounded tridiagonal operators and spectra of their finite truncations |
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| Authors: | Eugenia N. Petropoulou,L. Velá zquez |
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| Affiliation: | 1. Department of Civil Engineering, Division of Geotechnical Engineering and Hydraulic Engineering, University of Patras, 26504 Patras, Greece;2. Department of Applied Mathematics and IUMA, Universidad de Zaragoza, C/María de Luna 3, 50018 Zaragoza, Spain |
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| Abstract: | ![]()
This paper addresses two different but related questions regarding an unbounded symmetric tridiagonal operator: its self-adjointness and the approximation of its spectrum by the eigenvalues of its finite truncations. The sufficient conditions given in both cases improve and generalize previously known results. It turns out that, not only self-adjointness helps to study limit points of eigenvalues of truncated operators, but the analysis of such limit points is a key help to prove self-adjointness. Several examples show the advantages of these new results compared with previous ones. Besides, an application to the theory of continued fractions is pointed out. |
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| Keywords: | Unbounded Jacobi matrices Self-adjointness Spectrum of an operator Limit points of eigenvalues Zeros of orthogonal polynomials Jacobi continued fractions |
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