Spectrum of periodic elliptic operators with distant perturbations in space

A periodic selfadjoint differential operator of even order and with distant perturbations in a multidimensional space is treated. The role of perturbations is played by arbitrary localized operators. The localization is described by specially chosen weight functions. The behavior of the spectrum of...

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Bibliographic Details
Published in:St. Petersburg mathematical journal 2014-10, Vol.25 (5), p.735-754
Main Author: Golovina, A. M.
Format: Article
Language:English
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Summary:A periodic selfadjoint differential operator of even order and with distant perturbations in a multidimensional space is treated. The role of perturbations is played by arbitrary localized operators. The localization is described by specially chosen weight functions. The behavior of the spectrum of the perturbed operator is studied under the condition that the distance between the domains where the perturbation are localized tends to infinity. It is shown that there exists a simple isolated eigenvalue of the perturbed operator that tends to a simple isolated eigenvalue of the limit operator. Series expansions are obtained for this eigenvalue of the perturbed operator and for the corresponding eigenfunction. Uniform convergence for these series is shown and formulas for their terms are deduced.
ISSN:1061-0022
1547-7371
DOI:10.1090/S1061-0022-2014-01314-3