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    Please use this identifier to cite or link to this item: http://tkuir.lib.tku.edu.tw:8080/dspace/handle/987654321/41310

    Title: Some infinite series and functional relations that arose in the context of fractional calculus
    Authors: Chen, Kung-yu;陳功宇;Srivastava, H. M.
    Contributors: 淡江大學數學學系
    Keywords: fractional calculus;Psi (or Digamma) functions;generalized hypergeometric functions;functional relations;H-functions;Mellin–Barnes contour integral
    Date: 2000-12-01
    Issue Date: 2010-01-28 07:15:39 (UTC+8)
    Publisher: Elsevier
    Abstract: Several interesting infinite series relations were derived recently by applying such operators of fractional calculus as the familiar Riemann–Liouville fractional differintegral operator 0Dμz of (real or complex) order μ. The main object of this paper is to present much simpler alternative derivations of substantially more general families of infinite series relations without using fractional calculus. Some relevant connections among various known results are also provided.
    Relation: Journal of Mathematical Analysis and Applications 252(1), pp.376-388
    DOI: 10.1006/jmaa.2000.7079
    Appears in Collections:[數學學系暨研究所] 期刊論文

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