Publication Date:
2012-10-13
Description:
In this paper we investigate the superconvergence of local discontinuous Galerkin (LDG) methods for solving one-dimensional linear time-dependent fourth-order problems. We prove that the error between the LDG solution and a particular projection of the exact solution, e u , achieves th-order superconvergence when polynomials of degree k ( k ≥ 1) are used. Numerical experiments with P k polynomials, with 1 ≤ k ≤ 3, are displayed to demonstrate the theoretical results, which show that the error e u actually achieves ( k +2)th-order superconvergence, indicating that the error bound for e u obtained in this paper is suboptimal. Initial boundary value problems, nonlinear equations and solutions having singularities, are numerically investigated to verify that the conclusions hold true for very general cases.
Print ISSN:
0272-4979
Electronic ISSN:
1464-3642
Topics:
Mathematics
Permalink