The Spectral Measure Of A Jacobi Matrix In Terms Of The Fourier Transform Of The Perturbation

We study the spectral properties of Jabobi matrices. By combining Killip's technique [13] with the technique of Killip and Simon [12] we obtain a result relating the properties of the elements of Jacobi matrices and the corresponding spectral measures. This theorem is a natural extension of a r...

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Main Author: O. Safronov
Other Authors: The Pennsylvania State University CiteSeerX Archives
Format: Text
Language:English
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laptev
Online Access:http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.20.1360
http://www.ma.utexas.edu/mp_arc/c/02/02-306.ps.gz
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spelling ftciteseerx:oai:CiteSeerX.psu:10.1.1.20.1360 2023-05-15T17:07:15+02:00 The Spectral Measure Of A Jacobi Matrix In Terms Of The Fourier Transform Of The Perturbation O. Safronov The Pennsylvania State University CiteSeerX Archives 0 application/postscript http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.20.1360 http://www.ma.utexas.edu/mp_arc/c/02/02-306.ps.gz en eng http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.20.1360 http://www.ma.utexas.edu/mp_arc/c/02/02-306.ps.gz Metadata may be used without restrictions as long as the oai identifier remains attached to it. http://www.ma.utexas.edu/mp_arc/c/02/02-306.ps.gz text ftciteseerx 2016-01-07T17:20:17Z We study the spectral properties of Jabobi matrices. By combining Killip's technique [13] with the technique of Killip and Simon [12] we obtain a result relating the properties of the elements of Jacobi matrices and the corresponding spectral measures. This theorem is a natural extension of a recent result of Laptev-Naboko-Safronov[17]. The author contemplated this paper as a part of an updated version of a different article. Therefore the present text will probably exist only as a preprint or will be published as a part of another paper. 0. Text laptev Unknown
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language English
description We study the spectral properties of Jabobi matrices. By combining Killip's technique [13] with the technique of Killip and Simon [12] we obtain a result relating the properties of the elements of Jacobi matrices and the corresponding spectral measures. This theorem is a natural extension of a recent result of Laptev-Naboko-Safronov[17]. The author contemplated this paper as a part of an updated version of a different article. Therefore the present text will probably exist only as a preprint or will be published as a part of another paper. 0.
author2 The Pennsylvania State University CiteSeerX Archives
format Text
author O. Safronov
spellingShingle O. Safronov
The Spectral Measure Of A Jacobi Matrix In Terms Of The Fourier Transform Of The Perturbation
author_facet O. Safronov
author_sort O. Safronov
title The Spectral Measure Of A Jacobi Matrix In Terms Of The Fourier Transform Of The Perturbation
title_short The Spectral Measure Of A Jacobi Matrix In Terms Of The Fourier Transform Of The Perturbation
title_full The Spectral Measure Of A Jacobi Matrix In Terms Of The Fourier Transform Of The Perturbation
title_fullStr The Spectral Measure Of A Jacobi Matrix In Terms Of The Fourier Transform Of The Perturbation
title_full_unstemmed The Spectral Measure Of A Jacobi Matrix In Terms Of The Fourier Transform Of The Perturbation
title_sort spectral measure of a jacobi matrix in terms of the fourier transform of the perturbation
publishDate
url http://citeseerx.ist.psu.edu/viewdoc/summary?doi=10.1.1.20.1360
http://www.ma.utexas.edu/mp_arc/c/02/02-306.ps.gz
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op_source http://www.ma.utexas.edu/mp_arc/c/02/02-306.ps.gz
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http://www.ma.utexas.edu/mp_arc/c/02/02-306.ps.gz
op_rights Metadata may be used without restrictions as long as the oai identifier remains attached to it.
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