Asymptotic expansion of the Mathieu and prolate spheroidal eigenvalues for large parameter c
Keyword(s):
The asymptotic expansions of the Mathieu eigenfunctions and the prolate spheroidal wave functions can be expanded in terms of the parabolic cylinder functions, from which their asymptotic eigenvalue can be expressed in an inverse power series of c, where the parameter c is proportional to the operating wave number. Analytical expressions of the eigenvalues, as well as those of the expansion coefficients of the eigenfunctions, are derived and verified with numerical results.PACS. No.: 2.30 MV
1986 ◽
Vol 17
(1)
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pp. 240-248
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2005 ◽
Vol 53
(12)
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pp. 3990-4000
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Approximate formulae for certain prolate spheroidal wave functions valid for large values of both order and band-limit
2007 ◽
Vol 22
(1)
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pp. 105-123
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1988 ◽
Vol 19
(3)
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pp. 751-761
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