| dbo:abstract |
In mathematics, the Fox H-function H(x) is a generalization of the Meijer G-function and the Fox–Wright function introduced by Charles Fox.It is defined by a Mellin–Barnes integral where L is a certain contour separating the poles of the two factors in the numerator. Compare to the Meijer G-function: The special case for which the Fox H reduces to the Meijer G is Aj = Bk = C, C > 0 for j = 1...p and k = 1...q : A generalization of the Fox H-function is given by Ram Kishore Saxena Innayat Hussain . For a further generalization of this function, useful in physics and statistics was given by A.M.Mathai and Ram Kishore Saxena, see . (en) |
| dbo:thumbnail |
wiki-commons:Special:FilePath/Plot_of_the_Fox_H_fun...(),()),(((-1,½)),()),z).svg?width=300 |
| dbo:wikiPageExternalLink |
https://gitlab.com/RZ-FZJ/hypergeom https://mathoverflow.net/questions/407760/is-there-a-specific-named-function-that-is-the-inverse-of-xxa-for-x-real/407777%23407777 |
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dbc:Hypergeometric_functions dbr:GitLab dbr:MathOverflow dbr:Fox–Wright_function dbr:Meijer_G-function dbc:Special_functions dbr:Ram_Kishore_Saxena dbr:Transactions_of_the_American_Mathematical_Society dbr:Springer-Verlag dbr:Mellin–Barnes_integral dbr:File:Plot_of_the_Fox_H_function_H((((a...)_with_H(((),()),(((-1,½)),()),z).svg |
| dbp:authorlink |
Charles Fox (en) |
| dbp:first |
Charles (en) |
| dbp:last |
Fox (en) |
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dbt:Citation dbt:Cite_book dbt:Harv dbt:Harvtxt dbt:Redirect-distinguish dbt:Reflist dbt:Short_description dbt:Harvs dbt:Mathanalysis-stub |
| dbp:year |
1961 (xsd:integer) |
| dcterms:subject |
dbc:Hypergeometric_functions dbc:Special_functions |
| rdf:type |
owl:Thing yago:Abstraction100002137 yago:Function113783816 yago:MathematicalRelation113783581 yago:Relation100031921 yago:WikicatHypergeometricFunctions |
| rdfs:comment |
In mathematics, the Fox H-function H(x) is a generalization of the Meijer G-function and the Fox–Wright function introduced by Charles Fox.It is defined by a Mellin–Barnes integral where L is a certain contour separating the poles of the two factors in the numerator. Compare to the Meijer G-function: The special case for which the Fox H reduces to the Meijer G is Aj = Bk = C, C > 0 for j = 1...p and k = 1...q : (en) |
| rdfs:label |
Fox H-function (en) |
| owl:differentFrom |
dbr:Harmonic_number |
| owl:sameAs |
freebase:Fox H-function yago-res:Fox H-function wikidata:Fox H-function https://global.dbpedia.org/id/51cmQ |
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wikipedia-en:Fox_H-function?oldid=1113268643&ns=0 |
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wiki-commons:Special:FilePath/Plot_of_the_Fox_H_fun...)_with_H(((),()),(((-1,½)),()),z).svg |
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wikipedia-en:Fox_H-function |
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dbr:H-Function dbr:H-function dbr:H_function dbr:Fox_function |
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dbr:Ram_Kishore_Saxena |
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wikipedia-en:Fox_H-function |
