L1/LDG Method for Caputo-Hadamard Time Fractional Diffusion Equation.
Zhen WangPublished in: Communications on applied mathematics and computation (2023)
In this paper, a class of discrete Gronwall inequalities is proposed. It is efficiently applied to analyzing the constructed L1/local discontinuous Galerkin (LDG) finite element methods which are used for numerically solving the Caputo-Hadamard time fractional diffusion equation. The derived numerical methods are shown to be α -robust using the newly established Gronwall inequalities, that is, it remains valid when α → 1 - . Numerical experiments are given to demonstrate the theoretical statements.
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