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References
REFERENCES
(1)
(1)Boas, R. P. Jr. and Buck, R. C.Polynomial expansions of analytic functions (Springer-Verlag; Berlin, 1958).CrossRefGoogle Scholar
(2)
(2)Erdélyi, A.Magnus, W.Oberhettinger, F. and Tricomi, F. G.Higher transcendental functions, 3 vols. (McGraw-Hill; New York, 1953).Google Scholar
(3)
(3)Fields, Jerry L. and Wimp, Jet. Expansions of hypergeometric functions in hypergeometric functions. Math. Tables Aids Comput.15 (1961), 390–395.CrossRefGoogle Scholar
(4)
(4)Erdélyi, A.Magnus, W.Oberhettinger, F. and Tricomi, F. G.Tables of integral transforms, 2 vols. (McGraw-Hill; New York, 1953).Google Scholar
(5)
(5)Szegö, G.Orthogonal polynomials (American Mathematical Society Colloquium Publication, 23, revised ed.; New York, 1959).Google Scholar
(6)
(6)Lanczos, C. Introduction, National Bureau of Standards Applied Mathematics Series no. 9, Tables of Chebyshev polynomials (U.S. Government Printing Office; Washington D.C., 1952).Google Scholar
(8)Watson, G. N.A treatise on the theory of Bessel functions, 2nd ed. (Cambridge, 1945).Google Scholar
(9)
(9)Luke, Y. L. and Coleman, R. L.Expansions of hypergeometric functions in series of other hypergeometric functions. Math. Tables Aids Comput.15 (1961), 235.Google Scholar
(10)
(10)Tricomi, F. G.Sulla funzione gamma incompleta. Ann. Mat. Pura Appl. (4), 31 (1950), 263–279.CrossRefGoogle Scholar
(11)
(11)Gram, J. P. Note sur le calcul de la fonction ξ(s) de Riemann. Oversigt K. Danske Vidensk. Selskabs Forhandl (1895), 303–308.Google Scholar
(12)
(12)Miller, J. C. P. Derivatives of the gamma function; unpublished ms.Google Scholar
(13)
(13)National Bureau of Standards. Handbook of mathematical tables, ch. 6. The gamma function and related functions; unpublished ms.Google Scholar
(14)
(14)Clenshaw, C. W.A note on the summation of Chebyshev series. Math. Tables Aids Comput.9 (1955), 118–120.CrossRefGoogle Scholar
(15)
(15)Rainville, Earl D.Special functions (Macmillan; New York, 1960).Google Scholar