Numerical approaches for solution of hyperbolic difference equations on circle

The present paper considers nonlocal boundary value problems for hyperbolic equations on the circle T1. The first-order modified difference scheme for the numerical solution of nonlocal boundary value problems for hyperbolic equations on a circle is presented. The stability and coercivity estimates in various Hölder norms for solutions of the difference schemes are established. Moreover, numerical examples are provided. © 2024 Walter de Gruyter GmbH, Berlin/Boston.

Авторы

Ashyralyev A. , Hezenci F. , Sozen Y.

Журнал

Georgian Mathematical Journal

Издательство

De Gruyter

Номер выпуска

Язык

Английский

Страницы

723-730

Статус

Опубликовано

Ссылка

Внешняя ссылка

DOI

10.1515/GMJ-2023-2103

Том

Год

2024

Организации

¹ Department of Mathematics, Düzce University, Faculty of Science and Arts, Düzce, 81620, Turkey
² Department of Mathematics, Bahcesehir University, Istanbul, 34353, Turkey
³ Peoples' Friendship University of Russia (RUDN University), Ul. Miklukho Maklaya 6, Moscow, 117198, Russian Federation
⁴ Institute of Mathematics and Mathematical Modeling, Almaty, 050010, Kazakhstan
⁵ Department of Mathematics, Hacettepe University, Ankara, 06800, Turkey

Ключевые слова

Difference equations on manifolds; difference schemes; self-adjoint positive definite operator; well-posedness

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