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Convergence and superconvergence analysis for nonlinear delay reaction–diffusion system with nonconforming finite element

Shanshan Peng, Meng Li, Yanmin Zhao, Fenling Wang, Yanhua Shi

2022Numerical Methods for Partial Differential Equations11 citationsDOI

Abstract

Abstract In this article, we propose and analyze several numerical methods for the nonlinear delay reaction–diffusion system with smooth and nonsmooth solutions, by using Quasi‐Wilson nonconforming finite element methods in space and finite difference methods (including uniform and nonuniform L 1 and L 2‐1 σ schemes) in time. The optimal convergence results in the senses of L 2 ‐norm and broken H 1 ‐norm, and H 1 ‐norm superclose results are derived by virtue of two types of fractional Grönwall inequalities. Then, the interpolation postprocessing technique is used to establish the superconvergence results. Moreover, to improve computational efficiency, fast algorithms by using sum‐of‐exponential technique are built for above proposed numerical schemes. Finally, we present some numerical experiments to confirm the theoretical correctness and show the effectiveness of the fast algorithms.

Topics & Concepts

SuperconvergenceMathematicsNorm (philosophy)Finite element methodNonlinear systemCorrectnessConvergence (economics)Exponential functionApplied mathematicsReaction–diffusion systemInterpolation (computer graphics)Mathematical analysisAlgorithmComputer scienceLawQuantum mechanicsEconomicsEconomic growthPhysicsAnimationPolitical scienceThermodynamicsComputer graphics (images)Differential Equations and Numerical MethodsFractional Differential Equations SolutionsNumerical methods for differential equations
Convergence and superconvergence analysis for nonlinear delay reaction–diffusion system with nonconforming finite element | Litcius