Difference between revisions of "Hypergeometric series"
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''Gauss series'' | ''Gauss series'' | ||
A series of the form | A series of the form | ||
| − | + | $$ | |
| + | F ( \alpha , \beta ; \gamma ; z) = | ||
| + | $$ | ||
| − | + | $$ | |
| + | = \ | ||
| + | 1 + \sum _ {n = 1 } ^ \infty | ||
| + | \frac{\alpha \dots ( \alpha + n - 1) \beta \dots | ||
| + | ( \beta + n - 1) }{n! \gamma \dots ( \gamma + n - 1) } | ||
| + | z ^ {n} . | ||
| + | $$ | ||
| − | Such a series is meaningful if | + | Such a series is meaningful if $ \gamma $ |
| + | is not equal to zero or to a negative integer; it converges for $ | z | < 1 $. | ||
| + | If, in addition, $ \mathop{\rm Re} ( \gamma - \alpha - \beta ) > 0 $, | ||
| + | it also converges for $ z = 1 $. | ||
| + | In such a case the Gauss formula | ||
| − | + | $$ | |
| + | F ( \alpha , \beta ; \gamma ; 1) = \ | ||
| − | where | + | \frac{\Gamma ( \gamma ) \Gamma ( \gamma - \alpha - \beta ) }{\Gamma ( \gamma - \alpha ) \Gamma ( \gamma - \beta ) } |
| + | , | ||
| + | $$ | ||
| + | |||
| + | where $ \Gamma ( z) $ | ||
| + | is the gamma-function, holds. An analytic function defined with the aid of a hypergeometric series is said to be a [[Hypergeometric function|hypergeometric function]]. | ||
A generalized hypergeometric series is a series of the form | A generalized hypergeometric series is a series of the form | ||
| − | + | $$ | |
| − | + | {} _ {p} F _ {q} ( \alpha _ {1} \dots \alpha _ {p} ; \ | |
| − | + | \gamma _ {1} \dots \gamma _ {q} ; z) = | |
| − | + | $$ | |
| − | |||
| − | + | $$ | |
| + | = \ | ||
| + | \sum _ {n = 0 } ^ \infty { | ||
| + | \frac{1}{n!} | ||
| + | } | ||
| + | \frac{( \alpha _ {1} ) _ {n} \dots ( \alpha _ {p} ) _ {n} }{( \gamma _ {1} ) _ {n} \dots ( \gamma _ {q} ) _ {n} } | ||
| + | z ^ {n} , | ||
| + | $$ | ||
| + | where $ ( x) _ {n} \equiv x( x + 1) \dots ( x + n - 1) $. | ||
| + | If this notation is used, the series | ||
| + | is written as $ {} _ {2} F _ {1} ( \alpha , \beta ; \gamma ; z) $. | ||
====Comments==== | ====Comments==== | ||
| − | Generalized hypergeometric series can be characterized as power series | + | Generalized hypergeometric series can be characterized as power series $ \sum _ {n = 0 } ^ \infty A _ {n} z ^ {n} $ |
| + | such that $ A _ {n + 1 } /A _ {n} $ | ||
| + | is a rational function of $ n $. | ||
| + | An analogous characterization for series in two variables was given by J. Horn. This yields a class of power series in two variables which includes the various Appell's hypergeometric series, cf. [[#References|[a1]]]. | ||
| − | Basic hypergeometric series can be characterized as power series | + | Basic hypergeometric series can be characterized as power series $ \sum _ {n = 0 } ^ \infty A _ {n} z ^ {n} $ |
| + | such that $ A _ {n + 1 } /A _ {n} $ | ||
| + | is a rational function of $ q ^ {n} $, | ||
| + | where $ q $ | ||
| + | is a fixed complex number not equal to 0 or 1. Such series have the form | ||
| − | + | $$ | |
| + | {} _ {r} \phi _ {s} ( a _ {1} \dots a _ {r} ; \ | ||
| + | b _ {1} \dots b _ {s} ; \ | ||
| + | q, z) = | ||
| + | $$ | ||
| − | + | $$ | |
| + | = \ | ||
| + | \sum _ {n = 0 } ^ \infty | ||
| + | \frac{[ ( - 1 ) ^ {n} q ^ {n ( n - | ||
| + | 1)/2 } ] ^ {s - r + 1 } }{( q; q ) _ {n} } | ||
| + | |||
| + | \frac{( | ||
| + | a _ {1} ; q ) _ {n} \dots ( a _ {r} ; q ) _ {n} }{ | ||
| + | ( b _ {1} ; q ) _ {n} \dots ( b _ {s} ; q ) _ {n} } | ||
| + | z ^ {n} , | ||
| + | $$ | ||
| − | where | + | where $ ( x; q) _ {n} \equiv ( 1 - x) ( 1 - qx) \dots ( 1 - q ^ {n - 1 } x) $. |
| + | See [[#References|[a2]]]. | ||
Hypergeometric functions of matrix argument have also been studied, cf. [[#References|[a3]]]. | Hypergeometric functions of matrix argument have also been studied, cf. [[#References|[a3]]]. | ||
Revision as of 22:11, 5 June 2020
Gauss series
A series of the form
$$ F ( \alpha , \beta ; \gamma ; z) = $$
$$ = \ 1 + \sum _ {n = 1 } ^ \infty \frac{\alpha \dots ( \alpha + n - 1) \beta \dots ( \beta + n - 1) }{n! \gamma \dots ( \gamma + n - 1) } z ^ {n} . $$
Such a series is meaningful if $ \gamma $ is not equal to zero or to a negative integer; it converges for $ | z | < 1 $. If, in addition, $ \mathop{\rm Re} ( \gamma - \alpha - \beta ) > 0 $, it also converges for $ z = 1 $. In such a case the Gauss formula
$$ F ( \alpha , \beta ; \gamma ; 1) = \ \frac{\Gamma ( \gamma ) \Gamma ( \gamma - \alpha - \beta ) }{\Gamma ( \gamma - \alpha ) \Gamma ( \gamma - \beta ) } , $$
where $ \Gamma ( z) $ is the gamma-function, holds. An analytic function defined with the aid of a hypergeometric series is said to be a hypergeometric function.
A generalized hypergeometric series is a series of the form
$$ {} _ {p} F _ {q} ( \alpha _ {1} \dots \alpha _ {p} ; \ \gamma _ {1} \dots \gamma _ {q} ; z) = $$
$$ = \ \sum _ {n = 0 } ^ \infty { \frac{1}{n!} } \frac{( \alpha _ {1} ) _ {n} \dots ( \alpha _ {p} ) _ {n} }{( \gamma _ {1} ) _ {n} \dots ( \gamma _ {q} ) _ {n} } z ^ {n} , $$
where $ ( x) _ {n} \equiv x( x + 1) \dots ( x + n - 1) $. If this notation is used, the series
is written as $ {} _ {2} F _ {1} ( \alpha , \beta ; \gamma ; z) $.
Comments
Generalized hypergeometric series can be characterized as power series $ \sum _ {n = 0 } ^ \infty A _ {n} z ^ {n} $ such that $ A _ {n + 1 } /A _ {n} $ is a rational function of $ n $. An analogous characterization for series in two variables was given by J. Horn. This yields a class of power series in two variables which includes the various Appell's hypergeometric series, cf. [a1].
Basic hypergeometric series can be characterized as power series $ \sum _ {n = 0 } ^ \infty A _ {n} z ^ {n} $ such that $ A _ {n + 1 } /A _ {n} $ is a rational function of $ q ^ {n} $, where $ q $ is a fixed complex number not equal to 0 or 1. Such series have the form
$$ {} _ {r} \phi _ {s} ( a _ {1} \dots a _ {r} ; \ b _ {1} \dots b _ {s} ; \ q, z) = $$
$$ = \ \sum _ {n = 0 } ^ \infty \frac{[ ( - 1 ) ^ {n} q ^ {n ( n - 1)/2 } ] ^ {s - r + 1 } }{( q; q ) _ {n} } \frac{( a _ {1} ; q ) _ {n} \dots ( a _ {r} ; q ) _ {n} }{ ( b _ {1} ; q ) _ {n} \dots ( b _ {s} ; q ) _ {n} } z ^ {n} , $$
where $ ( x; q) _ {n} \equiv ( 1 - x) ( 1 - qx) \dots ( 1 - q ^ {n - 1 } x) $. See [a2].
Hypergeometric functions of matrix argument have also been studied, cf. [a3].
References
| [a1] | P. Appell, M.J. Kampé de Fériet, "Fonctions hypergéométriques et hypersphériques: Polynômes d'Hermite" , Gauthier-Villars (1926) |
| [a2] | G. Gasper, M. Rahman, "Basic hypergeometric series" , Cambridge Univ. Press (1989) |
| [a3] | K. Gross, D. Richards, "Special functions of matrix argument I" Trans. Amer. Math. Soc. , 301 (1987) pp. 781–811 |
Hypergeometric series. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Hypergeometric_series&oldid=11231