UNIQUENESS OF THE ENTROPY SOLUTION TO THE DIRICHLET PROBLEM FOR AN ELLIPTIC EQUATION WITH A MEASURE-VALUED POTENTIAL IN A HYPERBOLIC SPACE

V. F Vildanova; Вильданова В. Ф.

doi:10.31857/S0374064124120062

UNIQUENESS OF THE ENTROPY SOLUTION TO THE DIRICHLET PROBLEM FOR AN ELLIPTIC EQUATION WITH A MEASURE-VALUED POTENTIAL IN A HYPERBOLIC SPACE

Autores: Vildanova V.F¹
Afiliações:
1. Institute of Mathematics with Computing Centre of Ufa Scientific Center of RAS
Edição: Volume 60, Nº 12 (2024)
Páginas: 1653-1663
Seção: PARTIAL DERIVATIVE EQUATIONS
URL: https://kld-journal.fedlab.ru/0374-0641/article/view/649582
DOI: https://doi.org/10.31857/S0374064124120062
EDN: https://elibrary.ru/IPFFXJ
ID: 649582

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Resumo

We consider the Dirichlet problem in the hyperbolic space for a nonlinear equation of the second order with measure-valued potential. The assumptions on the structure of the equation are stated in terms of a generalized

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nonlinear equation, entropy solution, hyperbolic space

Sobre autores

V. Vildanova

Institute of Mathematics with Computing Centre of Ufa Scientific Center of RAS

Email: gilvenera@mail.ru
Russia

Bibliografia

Вильданова, В.Ф. Энтропийное решение для уравнения с мерозначным потенциалом в гиперболическом пространстве / В.Ф. Вильданова, Ф.Х. Мукминов // Мат. сб. — 2023. — Т. 214, № 11. — С. 37–62.
Vil’danova, V.F. and Mukminov, F.Kh., Entropy solution for an equation with measure-valued potential in a hyperbolic space, Sb. Math., 2023, vol. 214, no. 11, pp. 1534–1559.
An
Кожевникова, Л.М. Эквивалентность энтропийных и ренормализованных решений нелинейной эллиптической задачи в пространствах Музилака–Орлича / Л.М. Кожевникова, А.П. Кашникова // Дифференц. уравнения. — 2023. — Т. 59, № 1. — С. 35–51.
Kozhevnikova, L.M. and Kashnikova, A.P., Equivalence of entropy and renormalized solutions of a nonlinear elliptic problem in Musielak–Orlicz spaces, Differ. Equat., 2023, vol. 59, no. 1, pp. 34–50.
Saintier, N. Nonlinear elliptic equations with measure valued absorption potential / N. Saintier, L. V’eron // Ann. Scuola Norm. Sup. Pisa Cl. Sci. — 2021. — V. 22, № 1. — P. 351–397.
Malusa, A. Renormalized solutions to elliptic equations with measure data in unbounded domains / A. Malusa, M.M. Porzio // Nonlin. Anal. — 2007. — V. 67, № 8. — P. 2370–2389.
Кашникова, А.П. Существование решений нелинейных эллиптических уравнений с данными в виде меры в пространствах Музилака–Орлича / А.П. Кашникова, Л.М. Кожевникова // Мат. сб. — 2022. — Т. 213, № 4. — С. 38–73.
Kashnikova, A.P. and Kozhevnikova L.M., Existence of solutions of nonlinear elliptic equations with measure data in Musielak–Orlicz spaces, Sb. Math., 2022, vol. 213, no. 4, pp. 476–511.
Vildanova, V.F. Perturbations of nonlinear elliptic operators by potentials in the space of multiplicators / V.F. Vildanova, F.Kh. Mukminov // J. Math. Sci. — 2021. — V. 257, № 5. — P. 569–578.
Chlebicka, I. Measure data elliptic problems with generalized Orlicz growth / I. Chlebicka // Proc. Roy. Soc. Edinburgh. Sect. A. — 2023. — V. 153, № 2. — P. 588–618.
Chlebicka, I. Essentially fully anisotropic Orlicz functions and uniqueness to measure data problem / I. Chlebicka, P. Nayar // Math. Methods Appl. Sci. — 2022. — V. 45, № 14. — P. 8503–8527.
Musielak, J. Orlicz Spaces and Modular Spaces / J. Musielak. — Berlin : Springer-Verlag, 1983. — 222 p.
Harjulehto, P. Orlicz Spaces and Generalized Orlicz Spaces / P. Harjulehto, P. H‥ast‥o. — Cham : Springer, 2019. — 167 p.
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Колмогоров, А.Н. Элементы теории функций и функционального анализа / А.Н. Колмогоров, С.В. Фомин. — М. : Наука, 1976. — 543 с.
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Volume 60, Nº 12 (2024)

Volume 60, Nº 12 (2024)

UNIQUENESS OF THE ENTROPY SOLUTION TO THE DIRICHLET PROBLEM FOR AN ELLIPTIC EQUATION WITH A MEASURE-VALUED POTENTIAL IN A HYPERBOLIC SPACE

Texto integral

Resumo

Palavras-chave

Sobre autores

V. Vildanova

Bibliografia

Arquivos suplementares