Results on a nonlinear wave equation with acoustic and fractional boundary conditions coupling by logarithmic source and delay terms: Global existence and asymptotic behavior of solutions

Results on a nonlinear wave equation with acoustic and fractional boundary conditions coupling by logarithmic source and delay terms: Global existence and asymptotic behavior of solutions

The nonlinear wave equation with acoustic and fractional boundary conditions, coupled with logarithmic source and delay terms, is notable for its capacity to model complex systems, contribute to the advancement of mathematical theory, and exhibit wide-ranging applicability to real-world problems. Th...

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Bibliographic Details
Main Authors: Abdelbaki Choucha, Salah Boulaaras, Fares Yazid, Rashid Jan, Ibrahim Mekawy
Format: Article
Language:English
Published: Elsevier 2024-11-01
Series:Results in Applied Mathematics
Subjects:
Nonlinear equations
Global existence
Partial differential equations
Lyapunov function
General decay
Fractional boundary dissipation
Online Access:http://www.sciencedirect.com/science/article/pii/S2590037424000852
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Summary:The nonlinear wave equation with acoustic and fractional boundary conditions, coupled with logarithmic source and delay terms, is notable for its capacity to model complex systems, contribute to the advancement of mathematical theory, and exhibit wide-ranging applicability to real-world problems. This paper investigates the global existence and general decay of solutions to a wave equation characterized by the inclusion of logarithmic source and delay terms, governed by both fractional and acoustic boundary conditions. The global existence of solutions is analyzed under various hypotheses, and the general decay behavior is established through the construction and application of a suitable Lyapunov function.
ISSN:2590-0374

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