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Meijer_G-function abstract "In mathematics, the G-function was introduced by Cornelis Simon Meijer (1936) as a very general function intended to include most of the known special functions as particular cases. This was not the only attempt of its kind: the generalized hypergeometric function and the MacRobert E-function had the same aim, but Meijer's G-function was able to include those as particular cases as well. The first definition was made by Meijer using a series; nowadays the accepted and more general definition is via a path integral in the complex plane, introduced in its full generality by Arthur Erdélyi in 1953.With the modern definition, the majority of the established special functions can be represented in terms of the Meijer G-function. A notable property is the closure of the set of all G-functions not only under differentiation but also under indefinite integration. In combination with a functional equation that allows to liberate from a G-function G(z) any factor zρ that is a constant power of its argument z, the closure implies that whenever a function is expressible as a G-function of a constant multiple of some constant power of the function argument, f(x) = G(cxγ), the derivative and the antiderivative of this function are expressible so too.The wide coverage of special functions also lends power to uses of Meijer's G-function other than the representation and manipulation of derivatives and antiderivatives. Thus, the definite integral over the positive real axis of any function g(x) that can be written as a product G1(cxγ)·G2(dxδ) of two G-functions with rational γ/δ equals just another G-function, and generalizations of integral transforms like the Hankel transform and the Laplace transform and their inverses result when suitable G-function pairs are employed as transform kernels.A still more general function, which introduces additional parameters into Meijer's G-function, is Fox's H-function.".
Meijer_G-function wikiPageExternalLink Vol1.pdf.
Meijer_G-function wikiPageExternalLink S0002-9939-1962-0144157-5.pdf.
Meijer_G-function wikiPageExternalLink S0002-9939-1963-0145263-2.pdf.
Meijer_G-function wikiPageExternalLink S0002-9939-1963-0149210-9.pdf.
Meijer_G-function wikiPageID "6453527".
Meijer_G-function wikiPageRevisionID "579794118".
Meijer_G-function authorlink "Cornelis Simon Meijer".
Meijer_G-function authorlink "Richard Askey".
Meijer_G-function first "A. P.".
Meijer_G-function first "A. U.".
Meijer_G-function first "Adri B. Olde".
Meijer_G-function first "Cornelis Simon".
Meijer_G-function first "R. A.".
Meijer_G-function first "Roop".
Meijer_G-function first "Yu. A.".
Meijer_G-function hasPhotoCollection Meijer_G-function.
Meijer_G-function id "16.17".
Meijer_G-function id "Meijer-G-functions&oldid=13688".
Meijer_G-function id "Meijer_transform&oldid=12567".
Meijer_G-function last "Askey".
Meijer_G-function last "Brychkov".
Meijer_G-function last "Daalhuis".
Meijer_G-function last "Klimyk".
Meijer_G-function last "Meijer".
Meijer_G-function last "Narain".
Meijer_G-function last "Prudnikov".
Meijer_G-function title "Meijer G-Function".
Meijer_G-function title "Meijer G-functions".
Meijer_G-function title "Meijer transform".
Meijer_G-function urlname "MeijerG-Function".
Meijer_G-function year "1936".
Meijer_G-function year "1940".
Meijer_G-function year "1941".
Meijer_G-function year "1962".
Meijer_G-function year "1963".
Meijer_G-function subject Category:Hypergeometric_functions.
Meijer_G-function type Abstraction100002137.
Meijer_G-function type Function113783816.
Meijer_G-function type HypergeometricFunctions.
Meijer_G-function type MathematicalRelation113783581.
Meijer_G-function type Relation100031921.
Meijer_G-function comment "In mathematics, the G-function was introduced by Cornelis Simon Meijer (1936) as a very general function intended to include most of the known special functions as particular cases. This was not the only attempt of its kind: the generalized hypergeometric function and the MacRobert E-function had the same aim, but Meijer's G-function was able to include those as particular cases as well.".
Meijer_G-function label "Funzione G di Meijer".
Meijer_G-function label "Meijer G-function".
Meijer_G-function label "Meijersche G-Funktion".
Meijer_G-function sameAs Meijersche_G-Funktion.
Meijer_G-function sameAs Funzione_G_di_Meijer.
Meijer_G-function sameAs m.0g5yn0.
Meijer_G-function sameAs Q1917756.
Meijer_G-function sameAs Q1917756.
Meijer_G-function sameAs Meijer_G-function.
Meijer_G-function wasDerivedFrom Meijer_G-function?oldid=579794118.
Meijer_G-function isPrimaryTopicOf Meijer_G-function.