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Conical functions of purely imaginary order and argument

Published online by Cambridge University Press:  25 September 2013

T. M. Dunster*
Affiliation:
Department of Mathematics and Statistics, College of Sciences, San Diego State University, 5500 Campanile Drive, San Diego, CA 92182-7720, USA, ([email protected])

Abstract

Associated Legendre functions are studied for the case where the degree is in conical form −½ + iτ (τ real), and the order iμ and argument ix are purely imaginary (μ and x real). Conical functions in this form have applications to Fourier expansions of the eigenfunctions on a closed geodesic. Real-valued numerically satisfactory solutions are introduced which are continuous for all real x. Uniform asymptotic approximations and expansions are then derived for the cases where one or both of μ and τ are large; these results (which involve elementary, Airy, Bessel and parabolic cylinder functions) are uniformly valid for unbounded x.

Type
Research Article
Copyright
Copyright © Royal Society of Edinburgh 2013 

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