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XXXIX.—Transformations of Hypergeometric Functions of Two Variables

Published online by Cambridge University Press:  14 February 2012

A. Erdélyi
A. Erdélyi
Affiliation:
Mathematical Institute, The University, Edinburgh
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Extract

I. There are several methods for obtaining transformations of hypergeometric functions of two variables.

Firstly, by transformation of the hypergeometric series. When the double series is rewritten as an infinite sum of hypergeometric functions of one variable, the known transformation theory of such functions can be applied to each term. This method is quite simple and, in a limited range, very effective for discovering transformations as well as proving them.

Secondly, by transformation of the systems of partial differential equations satisfied by the hypergeometric functions. This method, though simple in theory, is rather laborious in practice and not very useful for discovering new transformations.

Type
Research Article
Information
Proceedings of the Royal Society of Edinburgh Section A: Mathematics , Volume 62 , Issue 3 , 1948 , pp. 378 - 385
Copyright
Copyright © Royal Society of Edinburgh 1946

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References

REFERENCES TO LITERATURE

(1) Appell, P., and Kampé de Fériet, J., Fonctions hypergéométriques et hypersphériques. Polynomes d'Hermite, Paris, 1926.Google Scholar
(2) Bailey, W. N., Journ. London Math. Soc., XIII (1938), 812.CrossRefGoogle Scholar
(3) Borngässer, L., Dissertation, Darmstadt, 1933.Google Scholar
(4) Burchnall, J. L., and Chaundy, T. W., Quart. Journ. Maths., XI (1940), 249270.CrossRefGoogle Scholar
(5) Erdélyi, A., Nieuiv Arch, for Wskde (2), xx (1939), 134.Google Scholar
(6) Goursat, E., Ann. de l'École Norm. Sup. (2), XVI (1881), Supplement, pp. 3142.CrossRefGoogle Scholar
(7) Horn, J., Math. Ann., CV (1931), 381407.CrossRefGoogle Scholar
(8) Horn, J., Math. Ann., CXI (1935), 638677; CXIII (1936), 242–291; CXV (1938), 435–455: Monatshefte für Math. w. Phys., XLVII (1938), 186–194; XLVII (1939), 359–379.CrossRefGoogle Scholar