A Structure-Preserving Nonconforming FEM of Nonlinear Kirchhoff-Type Equation with Damping

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Abstract

Superconvergent behavior for nonlinear Kirchhoff-type with damping is researched by a structure-preserving nonconforming finite element method (FEM). A new implicit energy dissipation scheme is developed and the numerical solution is bounded in energy norm. The existence of the numerical solution is obtained with the help of the Brouwer fixed-point theorem and then the uniqueness is gained. Superconvergence characteristics is revealed by the properties of the nonconforming FE and a special splitting technique. Numerical tests confirm the correctness of the theoretical research results.

Keywords:

A structure-preserving nonconforming finite element method A splitting technique Kirchhoff-type equation with damping Superconvergent behavior

Author Biographies

  • Junjun Wang

    School of Mathematics and Statistics, Pingdingshan University, Pingdingshan 467000, China

  • Dongyang Shi

    School of Mathematics and Information Sciences, Yantai University, Yantai 264005, China

  • Shuo Wang

    School of Mathematics and Statistics, Pingdingshan University, Pingdingshan 467000, China

  • Xuesong Che

    School of Mathematics and Statistics, Pingdingshan University, Pingdingshan 467000, China

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DOI

10.4208/jcm.2509-m2024-0004

How to Cite

A Structure-Preserving Nonconforming FEM of Nonlinear Kirchhoff-Type Equation with Damping. (2026). Journal of Computational Mathematics. https://doi.org/10.4208/jcm.2509-m2024-0004