On the regularized gamma function (analysis problem)











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I have a quick question on the regularized gamma function, defined as



$Q (a,z)=frac{Gamma(a,z)}{Gamma(a)} ,. [1]$



What is the value of $Q (a,z)$ in the asymptotic limits $a rightarrow infty$ and $z rightarrow infty$ ?



[1] see http://mathworld.wolfram.com/RegularizedGammaFunction.html










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  • The limit and asymptotic as $a to +infty $ is not hard, what did you try ?
    – reuns
    Nov 18 at 4:28












  • I am not familiar with asymptotic calculus. But what I tried as a first guest is to increase $(a,z)$ using Mathematica and the regularized gamma function is shown to increase. So I guess that, as $(a,z) rightarrow infty$, since the function is bound between 0 and 1, that it saturates to 1. What do you think about that ?
    – Nath
    Nov 18 at 12:19

















up vote
1
down vote

favorite












I have a quick question on the regularized gamma function, defined as



$Q (a,z)=frac{Gamma(a,z)}{Gamma(a)} ,. [1]$



What is the value of $Q (a,z)$ in the asymptotic limits $a rightarrow infty$ and $z rightarrow infty$ ?



[1] see http://mathworld.wolfram.com/RegularizedGammaFunction.html










share|cite|improve this question






















  • The limit and asymptotic as $a to +infty $ is not hard, what did you try ?
    – reuns
    Nov 18 at 4:28












  • I am not familiar with asymptotic calculus. But what I tried as a first guest is to increase $(a,z)$ using Mathematica and the regularized gamma function is shown to increase. So I guess that, as $(a,z) rightarrow infty$, since the function is bound between 0 and 1, that it saturates to 1. What do you think about that ?
    – Nath
    Nov 18 at 12:19















up vote
1
down vote

favorite









up vote
1
down vote

favorite











I have a quick question on the regularized gamma function, defined as



$Q (a,z)=frac{Gamma(a,z)}{Gamma(a)} ,. [1]$



What is the value of $Q (a,z)$ in the asymptotic limits $a rightarrow infty$ and $z rightarrow infty$ ?



[1] see http://mathworld.wolfram.com/RegularizedGammaFunction.html










share|cite|improve this question













I have a quick question on the regularized gamma function, defined as



$Q (a,z)=frac{Gamma(a,z)}{Gamma(a)} ,. [1]$



What is the value of $Q (a,z)$ in the asymptotic limits $a rightarrow infty$ and $z rightarrow infty$ ?



[1] see http://mathworld.wolfram.com/RegularizedGammaFunction.html







real-analysis gamma-function






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share|cite|improve this question










asked Nov 18 at 1:10









Nath

437




437












  • The limit and asymptotic as $a to +infty $ is not hard, what did you try ?
    – reuns
    Nov 18 at 4:28












  • I am not familiar with asymptotic calculus. But what I tried as a first guest is to increase $(a,z)$ using Mathematica and the regularized gamma function is shown to increase. So I guess that, as $(a,z) rightarrow infty$, since the function is bound between 0 and 1, that it saturates to 1. What do you think about that ?
    – Nath
    Nov 18 at 12:19




















  • The limit and asymptotic as $a to +infty $ is not hard, what did you try ?
    – reuns
    Nov 18 at 4:28












  • I am not familiar with asymptotic calculus. But what I tried as a first guest is to increase $(a,z)$ using Mathematica and the regularized gamma function is shown to increase. So I guess that, as $(a,z) rightarrow infty$, since the function is bound between 0 and 1, that it saturates to 1. What do you think about that ?
    – Nath
    Nov 18 at 12:19


















The limit and asymptotic as $a to +infty $ is not hard, what did you try ?
– reuns
Nov 18 at 4:28






The limit and asymptotic as $a to +infty $ is not hard, what did you try ?
– reuns
Nov 18 at 4:28














I am not familiar with asymptotic calculus. But what I tried as a first guest is to increase $(a,z)$ using Mathematica and the regularized gamma function is shown to increase. So I guess that, as $(a,z) rightarrow infty$, since the function is bound between 0 and 1, that it saturates to 1. What do you think about that ?
– Nath
Nov 18 at 12:19






I am not familiar with asymptotic calculus. But what I tried as a first guest is to increase $(a,z)$ using Mathematica and the regularized gamma function is shown to increase. So I guess that, as $(a,z) rightarrow infty$, since the function is bound between 0 and 1, that it saturates to 1. What do you think about that ?
– Nath
Nov 18 at 12:19

















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