Elliptic Equations with General-Kind Nonlocal Potentials in Half-Spaces

In this paper, the Dirichlet problem in half-spaces is investigated for elliptic differential-difference equations such that the potential admits translations in arbitrary directions. Such equations with nonlocal potentials arise in various applications (not covered by classical differential equations of mathematical physics), while elliptic problems in anisotropic domains represent an independent research interest because phenomena specific for nonstationary equations frequently arise in such cases. We construct integral representations of solutions (expressed by convolutions of boundary-value functions with a Poisson-like kernel), prove its infinite smoothness outside the boundary hyperplane, and prove its uniform power-like decay as the timelike independent variable tends to infinity.

Authors
Publisher
Pleiades Publishing
Number of issue
10
Language
Russian
Pages
2725-2730
Status
Published
Volume
43
Year
2022
Organizations
  • 1 Peoples Friendship University of Russia (RUDN University)
Keywords
differential-difference equations; anisotropic domains; Elliptic problems; nonlocal potentials
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Other records

Антюхова Е.А., Артеев С.П., Бахриев Б.Х., Близнецкая Е.А., Болгов Р.В., Завьялова Е.Б., Зиновьева Е.С., Касаткин П.И., Кузнецов Т.Г., Лебедева М.М., Сета П.О., Сопильняк Э.А., Харкевич М.В., Кротова Т.Г., Василенко Е.П., Макарова А.А.
Общество с ограниченной ответственностью Издательство Аспект Пресс. 2022.