On a nonlinear general eigenvalue problem in Musielak–Orlicz spaces

Soufiane Kassimi; Hajar Sabiki; Hicham Moussa

doi:10.1515/gmj-2024-2050

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On a nonlinear general eigenvalue problem in Musielak–Orlicz spaces

Soufiane Kassimi , Hajar Sabiki und Hicham Moussa

Veröffentlicht/Copyright: 3. September 2024

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Aus der Zeitschrift Georgian Mathematical Journal Band 32 Heft 3

Abstract

In this paper, we concern the existence result of the following general eigenvalue problem:

{ 𝒜 ⁢ ( u ) = λ ⁢ ℬ ⁢ ( u ) in ⁢ Ω , D α ⁢ ( u ) = 0 on ⁢ ∂ ⁡ Ω ,

in an arbitrary Musielak–Orlicz spaces, where 𝒜 and ℬ are quasilinear operators in divergence form of order 2 ⁢ n and 2 ⁢ ( n - 1 ) , respectively. The main assumptions in this case are that 𝒜 and ℬ are potential operators with 𝒜 being elliptic and monotone. In this study, we intentionally avoid imposing constraints on the growth of a generalized N-function, including the Δ 2 -condition for both the generalized N-function and its conjugate. Consequently, this necessitates the formulation of the approximation theorem and the extensive utilization of modular convergence concepts.

Keywords: Nonlinear eigenvalue problem; Musielak–Orlicz spaces; quasilinear operators; approximation theorem

MSC 2020: 35J60; 35P30; 46E30

Acknowledgements

The authors express sincere appreciation to the Editors and anonymous referees for their invaluable feedback and thoughtful recommendations, which have greatly enhanced the substance and quality of this paper.

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Received: 2024-02-18

Revised: 2024-04-02

Accepted: 2024-04-22

Published Online: 2024-09-03

Published in Print: 2025-06-01

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Artikel in diesem Heft

https://doi.org/10.1515/gmj-2024-2050

Schlagwörter für diesen Artikel

Nonlinear eigenvalue problem; Musielak–Orlicz spaces; quasilinear operators; approximation theorem