International Journal on Minority and Group Rights. Том 10. 2003. С. 203-220
On Infinite Discrete Spectrum of Convolution Operators with Potentials
Abstract: In, we consider a self-adjoint operator which is the sum of a convolution operator and a potential. With minimal assumptions on the convolution kernel and the potential, we describe the location of its essential spectrum and give sufficient conditions for the existence of infinite series of discrete eigenvalues accumulating at the edges of the essential spectrum. We also discuss the case where a non-empty discrete spectrum appears in gaps of the essential spectrum. © Pleiades Publishing, Ltd. 2025.
Авторы
Borisov Denis Ivanovich 1, 2, 3 , Zhizhina Elena A. 4 , Piatnitski Andrey L. 4, 5
Номер выпуска
4
Язык
Английский
Страницы
457-461
Статус
Опубликовано
Ссылка
Том
59
Год
2025
Организации
- 1 Institute of Mathematics with Computer Center of the Ufa Science Center of the Russian Academy of Sciences, Ufa, Bashkortostan Republic, Russian Federation
- 2 RUDN University, Moscow, Moscow Oblast, Russian Federation
- 3 Bashkir State Pedagogical University, Ufa, Bashkortostan Republic, Russian Federation
- 4 Higher School of Modern Mathematics, Moscow Institute of Physics and Technology, Dolgoprudny, Moscow Oblast, Russian Federation
- 5 Campus Narvik, UiT Norges Arktiske Universitet, Tromso, Troms Og Finnmark, Norway
Ключевые слова
convolution operators with potentials; eigenvalues in gaps; gaps in the essential spectrum; infinite series of eigenvalues
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