Efficient and Accurate Legendre Spectral Element Methods for One-Dimensional Higher Order Problems
DOI:
https://doi.org/10.4208/nmtma.OA-2020-0082Keywords:
Legendre spectral element methods, higher order differential equations, Sobolev orthogonal/biorthogonal basis functions, high oscillatory or steep gradient solutions.Abstract
Efficient and accurate Legendre spectral element methods for solving one-dimensional higher order differential equations with high oscillatory or steep gradient solutions are proposed. Some Sobolev orthogonal/biorthogonal basis functions corresponding to each subinterval are constructed, which reduce the non-zero entries of linear systems and computational cost. Numerical experiments exhibit the effectiveness and accuracy of the suggested approaches.
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2021-01-26
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