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Line 1: {{short description\|Hypergeometric function in mathematics}} In mathematics, a '''general hypergeometric function''' is a generalization of the [[hypergeometric function]] that was introduced by {{harvtxt\|Gelfand\|1986}}. The general hypergeometric function is a function that is (more or less) defined on a Grassmannian, and depends on a choice of some complex numbers and signs. ▼ {{distinguish\|generalized hypergeometric function}} ▲In mathematics, a '''general hypergeometric function''' or '''Aomoto–Gelfand hypergeometric function''' is a generalization of the [[hypergeometric function]] that was introduced by {{harvtxt\|Gelfand\|1986}}. The general hypergeometric function is a function that is (more or less) defined on a [[Grassmannian]], and depends on a choice of some complex numbers and signs. ==References== {{Citation \| last1=Gelfand \| first1=I. M. \| authorlink=Israel Gelfand \| title=General theory of hypergeometric functions \| idmr=~~{{MR\|~~841131}} \| year=1986 \| journal=Doklady Akademii Nauk SSSR \| issn=0002-3264 \| volume=288 \| issue=1 \| pages=14–18}} (English translation in collected papers, volume III.) [[Kazuhiko Aomoto\|Aomoto, K.]] (1975), "Les équations aux différences linéaires et les intégrales des fonctions multiformes", ''J. Fac. Sci. Univ. Tokyo, Sect. IA Math.'' '''22''', 271-229. [[Category:~~hypergeometric~~Hypergeometric functions]]