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Error estimate of L1-ADI scheme for two-dimensional multi-term time fractional diffusion equation

Kexin Li, Hu Chen, Shusen Xie

2023Networks and Heterogeneous Media12 citationsDOIOpen Access PDF

Abstract

<abstract><p>A two-dimensional multi-term time fractional diffusion equation $ {D}_{t}^{\mathit{\boldsymbol{\alpha}}} u(x, y, t)- \Delta u(x, y, t) = f(x, y, t) $ is considered in this paper, where $ {D}_{t}^{\mathit{\boldsymbol{\alpha}}} $ is the multi-term time Caputo fractional derivative. To solve the equation numerically, L1 discretisation to each fractional derivative is used on a graded temporal mesh, together with a standard finite difference method for the spatial derivatives on a uniform spatial mesh. We provide a rigorous stability and convergence analysis of a fully discrete L1-ADI scheme for solving the multi-term time fractional diffusion problem. Numerical results show that the error estimate is sharp.</p></abstract>

Topics & Concepts

DiscretizationFractional calculusDiffusion equationTerm (time)MathematicsStability (learning theory)Mathematical analysisConvergence (economics)Time derivativeDiffusionDerivative (finance)Anomalous diffusionFinite difference methodApplied mathematicsPhysicsMathematical physicsInnovation diffusionQuantum mechanicsComputer scienceEconomyFinancial economicsEconomicsEconomic growthService (business)Knowledge managementMachine learningFractional Differential Equations SolutionsDifferential Equations and Numerical MethodsNonlinear Differential Equations Analysis
Error estimate of L1-ADI scheme for two-dimensional multi-term time fractional diffusion equation | Litcius