Highly Accurate Pseudospectral Approximations of the Prolate Spheroidal Wave Equation for Any Bandwidth Parameter and Zonal Wavenumber
| Autor: | H. Alıcı, Jie Shen |
|---|---|
| Rok vydání: | 2016 |
| Předmět: |
Numerical Analysis
Hermite polynomials Differential equation Applied Mathematics Mathematical analysis General Engineering 010103 numerical & computational mathematics Wave equation 01 natural sciences Theoretical Computer Science 010101 applied mathematics Classical orthogonal polynomials Computational Mathematics Computational Theory and Mathematics Orthogonal polynomials Chebyshev pseudospectral method Laguerre polynomials Wavenumber 0101 mathematics Software Mathematics |
| Zdroj: | Journal of Scientific Computing. 71:804-821 |
| ISSN: | 1573-7691 0885-7474 |
| DOI: | 10.1007/s10915-016-0321-7 |
| Popis: | The prolate spheroidal wave equation (PSWE) is transformed, using suitable mappings, into three different canonical forms which resemble the Jacobi, Laguerre and the Hermite differential equations. The eigenpairs of the PSWE are approximated with the corresponding classical orthogonal polynomial as a basis set. It is observed that for any zonal wavenumber m the Jacobi type pseudospectral methods are well suited for small bandwidth parameters c whereas the Hermite and Laguerre pseudospectral methods are appropriate for very large c values. Moreover, Jacobi pseudospectral methods work well for any parameter values such that $$m\ge c$$mźc. Our numerical results confirm that for any values of m, the Jacobi $$\left[ (\alpha ,\beta )=(\pm 1/2,m)\right] $$(ź,β)=(±1/2,m) and the Laguerre $$({\upgamma }=\pm 1/2)$$(ź=±1/2) pseudospectral methods formulated in this article for the numerical solution of the PSWE with small and very large bandwidth parameters, respectively, are highly efficient both from the accuracy and fastness point of view. |
| Databáze: | OpenAIRE |
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