A Few Infinite Integrals involving E-Functions
Glasgow mathematical journal, Tome 2 (1956) no. 4, pp. 170-172

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The object of this paper is to evaluate a few infinite integrals involving E-functions by applying the Parseval-Goldstein [1] theorem of Operational Calculus; that, ifandthenwhen the integrals are convergent.
Rathie, C. B. A Few Infinite Integrals involving E-Functions. Glasgow mathematical journal, Tome 2 (1956) no. 4, pp. 170-172. doi: 10.1017/S2040618500033281
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[(1)] (1)Goldstein, S., ‘Operational representation of Whittaker's confluent hypergeomctric function and Weber's parabolic cylinder function’, Proc. Land. Math. Soc.,(2), 34 (1932), 103–125. Google Scholar

[(2)] (2)MacRobert, T. M., ‘Some integrals involving Legendre and Bessel functions, Quar. Jour. Math., 11 (1940), 95–100. Google Scholar | DOI

[(3)] (3)MacRobert, T. M., ‘Some integrals involving E-functions’, Proc. Glasg. Math. Ass., 1 (1953), 190–191. Google Scholar | DOI

[(4)] (4)Ragab, F. M., ‘Integrals involving E-functions’, Proc. Glasg. Math. Ass., 1 (1953), 129–136. Google Scholar | DOI

[(5)] (5)Rathie, C. B., ‘Some infinite integrals involving E-functions, Jour. Indian Math. Soc., (4), 17 (1953), 167–175. Google Scholar

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