Some further properties of a q-analogue of MacRobert's E-function
Glasgow mathematical journal, Tome 6 (1963) no. 1, pp. 34-38

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1. Introduction. Recently, I gave an analogue [1] of the MacRobert's E-function [4[ in the formwhere the symbol denotes that a similar expression with a and β interchanged is to be added to the expression following it. It has since then been generalized by N. Agarwal [2], who defined and studied the q-analogue of the generalized E-function. In this paper I give some further properties of the Eq-function.
Agarwal, R. P. Some further properties of a q-analogue of MacRobert's E-function. Glasgow mathematical journal, Tome 6 (1963) no. 1, pp. 34-38. doi: 10.1017/S2040618500034675
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[1] 1.Agarwal, R. P., A basic analogue of MacRobert's E-function, Proc. Glasgow Math. Assoc. 5 (1961), 4–7. Google Scholar

[2] 2.Agarwal, N., A q-analogue of MacRobert's generalized E-function, Ganita 12 (1961). Google Scholar

[3] 3.Hahn, W., Über die höheren Heineschen Reihen und eine einheitliche Theorie der sogenannten speziellen Funktionen, Math. Nachr. 3 (1950), 257–294. Google Scholar

[4] 4.MacRobert, T. M., Induction proofs of the relation between certain asymptotic expansions and corresponding generalized hypergeometric series, Proc. Roy. Soc. Edinburgh 58 (1937), 1–13. Google Scholar

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