On the study of parabolic degenerate p-biharmonic problem with memory

On the study of parabolic degenerate p-biharmonic problem with memory

We explore a high-order parabolic p-biLaplace equation featuring a memory term. Employing Roth’s method, we derived an approximate solution for the semi-discretized problem in time. A series of a priori estimates were established, leading to deductions on convergence, existence, uniqueness, and qual...

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Veröffentlicht in:Journal of applied mathematics & computing 2024, Vol.70 (4), p.3175-3192
Hauptverfasser: Brahim, Noureddine Touati, Chaoui, Abderrezak, Henka, Youcef
Format: Artikel
Sprache:eng
Schlagworte:
Computational Mathematics and Numerical Analysis
Convergence
Discretization
Finite element analysis
Finite element method
Mathematical and Computational Engineering
Mathematics
Mathematics and Statistics
Mathematics of Computing
Numerical analysis
Original Research
Qualitative research
Theory of Computation
Uniqueness
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Beschreibung
Zusammenfassung:We explore a high-order parabolic p-biLaplace equation featuring a memory term. Employing Roth’s method, we derived an approximate solution for the semi-discretized problem in time. A series of a priori estimates were established, leading to deductions on convergence, existence, uniqueness, and qualitative outcomes within appropriate functional spaces. We introduced a comprehensive discretization approach utilizing the mixed finite element method. Finaly, we conducted a numerical experiment to confirm the convergence of the proposed scheme.
ISSN:1598-5865
1865-2085
DOI:10.1007/s12190-024-02079-3