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The asymptotic solution of differential equations with a turning point and singularities

Published online by Cambridge University Press:  24 October 2008

R. C. Thorne
Affiliation:
California Institute of TechnologyPasadena 4, California

Abstract

Asymptotic solutions of the differential equation

for large positive values of u, are examined; z is a complex variable in a domain Dz in which P1(z) and z2q(z) are regular and p1(z) does not vanish. In this paper it is shown that there exist Airy-type expansions of the solutions of this equation which are valid uniformly with respect to z in a domain in which z = 0 and z = z0 are interior points. If Dz is unbounded and the equation has a regular singularity at infinity, Airy-type expansions exist which are valid at z = 0, z = z0 and z = δ. If p(z) = constant + O (│z-1) as │ z │ → ∞ in Dz, similar expansions also exist. The results given here are new.

Type
Research Article
Copyright
Copyright © Cambridge Philosophical Society 1957

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References

REFERENCES

(1) Asymptotic solutions of differential equations with turning points. Tech. Rep. no. 1, under contract Nonr-220 (11) (California Institute of Technology, 1953).Google Scholar
(2) Cherry, T. M.Trans. Amer. Math. Soc. 68 (1950), 224–57.CrossRefGoogle Scholar
(3) Erdélyi, A. et al. Higher transcendental functions, vol. 1 (New York, 1953).Google Scholar
(4) Olver, F. W. J.Phil. Trans. A, 247 (1954), 307–27.Google Scholar
(5) Olver, F. W. J.Phil. Trans. A, 247 (1954), 328–68.Google Scholar
(6) Olver, F. W. J.Phil. Trans. A, 249 (1956), 6597.Google Scholar
(7) Watson, G. N.A treatise on the theory of Bessel functions, 2nd ed. (Cambridge, 1944).Google Scholar