Kassem Mustapha, Jennifer K. Ryan
This paper presents a superconvergence extraction technique for Volterra integrodifferential equations with smooth and non-smooth kernels. Specifically, extracting superconvergence is done via a post-processed discontinuous Galerkin (DG) method obtained from interpolating the DG solution using Lagrange polynomials at the nodal points. A global superconvergence error bound (in the L��-norm) is established. For a nonsmooth kernel, a family of non-uniform time meshes is used to compensate for the singular behaviour of the exact solution near t = 0. The derived theoretical results are numerically validated in a sample of test problems, demonstrating higher-than-expected convergence rates.
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