Talk:Confluent hypergeometric function

Is U(a,b,z) the Whittaker function? (anon, Oct 2006)

I don't know, that's not what A&S calls them.linas 00:43, 11 December 2006 (UTC) [reply ]

I am certainly not an expert, but I now know a bit about Kummer/Whittaker functions. Enough to find severe discrepancies between A&S and maple. Anybody have an opinion about whether I should tack some things up on the main page?

I am interested in the real part of Kummmer's function in the case a=2n+1, b=a+1 (real part of incomplete gamma). From a numerical point of view, which is cheaper to approximate, what is the convergence like for each and what methods are used? (anon, Nov 2006)

a sub n is defined in this article, but what is b sub n? — Preceding unsigned comment added by 213.122.105.23 (talk) 12:11, 29 April 2015 (UTC) [reply ]

The original text used to say

by setting b = 0 and c = 1

It is hard to tell what it meant because there was no c around.

M(1, 2, z)⁄M(0, 1, z)
= 1/
1 − 1⁄2 z/
1 + 1⁄6 z/
1 − 2⁄12 z/
1 + 2⁄20 z/
...
1 − k⁄(2 k − 1) (2 k) z/
1 + k⁄(2 k) (2 k + 1) z/
...
= 1 + 1/ 1 − 1⁄2 z/
1 + 1⁄6 z/
1 − 1⁄6 z/
1 + 1⁄10 z/
...
1 − 1⁄2 (2 k − 1) z/
1 + 1⁄2 (2 k + 1) z/
...

Transforming this fraction with the sequence (1, 2, 3, 2, ..., 2 k + 1, 2, ...) gives

1/
1 − z/
2 + z/
3 − z/
2 + z/
...
(2 k − 1) − z/
2 + z/
...
= (e^z − 1)⁄z

which is not quite what was postulated.

--Yecril (talk) 13:47, 3 October 2008 (UTC) [reply ]

The following is simply too cryptic for inclusion as it stands

Moreover,

${\displaystyle U(a,b,z)=z^{-a}\cdot ,円_{2}F_{0}\left(a,1+a-b;,円;-{\frac {1}{z}}\right),}${\displaystyle U(a,b,z)=z^{-a}\cdot ,円_{2}F_{0}\left(a,1+a-b;,円;-{\frac {1}{z}}\right),}

where the hypergeometric series ${\displaystyle _{2}F_{0}(\cdot ,\cdot ;;z)}${\displaystyle _{2}F_{0}(\cdot ,\cdot ;;z)} degenerates to a formal power series in z (which converges nowhere).

Please explain precisely what it is that this is supposed to convey, including a reference. Sławomir Biały (talk) 18:37, 3 July 2009 (UTC) [reply ]

Addendum: Presumably this is supposed to hold as an asymptotic series as z→0 in the right half-plane. But a reference (or at least a clarification) is needed to establish this. Sławomir Biały (talk) 19:05, 3 July 2009 (UTC) [reply ]

Referring to @book{andrews2000special,

 title={Special functions},
 author={Andrews, G.E. and Askey, R. and Roy, R.},
 year={2000},
 publisher={Cambridge Univ Pr}

} Page 189 They agree, the formal form above diverges and they provide a convergent alternative solution by taking limits on 2F1.

${\displaystyle {\frac {1}{\Gamma (a)}}\int _{0}^{\infty }e^{-xt}t^{a-1}(1+t)^{b-a-1}dt,}${\displaystyle {\frac {1}{\Gamma (a)}}\int _{0}^{\infty }e^{-xt}t^{a-1}(1+t)^{b-a-1}dt,}

Rrogers314 (talk) 20:53, 16 July 2009 (UTC) [reply ]

No one is disagreeing that the "formal form" diverges. The question is, what exactly is intended by the string of symbols

${\displaystyle U(a,b,z)=z^{-a}\cdot ,円_{2}F_{0}\left(a,1+a-b;,円;-{\frac {1}{z}}\right).}${\displaystyle U(a,b,z)=z^{-a}\cdot ,円_{2}F_{0}\left(a,1+a-b;,円;-{\frac {1}{z}}\right).}

Because a power series it most certainly is not. Sławomir Biały (talk) 03:03, 21 July 2009 (UTC) [reply ]

It's the result of various transformations and limits giving a asymptotic series for x "large". The above reference covers this and computes R_n(x) as O(1/x^n) . If you would like I could try to capture the reasoning or result. To give credit; how much can I quote before violating copyright? The book is succinct and I have a tendency to wander off; this means that quoting is probably preferred in some instatnces. My guess about your request is:

1) How does this form, both as symbols and series, come about

2) The effectiveness as a asymptotic series.

3) Skipping the actual intermediate details

?? Rrogers314 (talk) 15:17, 18 August 2009 (UTC) [reply ]

This section seems confusing

... .Similarly

${\displaystyle U(a,2a,x)={\frac {e^{\frac {x}{2}}}{\sqrt {\pi }}}x^{{\tfrac {1}{2}}-a}K_{a-{\tfrac {1}{2}}}\left({\tfrac {x}{2}}\right),}${\displaystyle U(a,2a,x)={\frac {e^{\frac {x}{2}}}{\sqrt {\pi }}}x^{{\tfrac {1}{2}}-a}K_{a-{\tfrac {1}{2}}}\left({\tfrac {x}{2}}\right),}

When a is a non-positive integer, this equals ${\displaystyle 2^{-a}\theta _{-a}\left({\tfrac {x}{2}}\right)}${\displaystyle 2^{-a}\theta _{-a}\left({\tfrac {x}{2}}\right)} where θ is a Bessel polynomial.

It isn't clear what the function ${\displaystyle K_{a-{\tfrac {1}{2}}}\left({\tfrac {x}{2}}\right)}${\displaystyle K_{a-{\tfrac {1}{2}}}\left({\tfrac {x}{2}}\right)} is supposed to be. The preceding text would incline me guess at Kelvin function, but it really shouldn't have to be a guess. Could somebody please add an appropriate definition? Thank you.

I am pretty sure its the modified Bessel function ${\displaystyle K_{v}(x)}${\displaystyle K_{v}(x)}

https://en.wikipedia.org/wiki/Bessel_function#Modified_Bessel_functions:_I%CE%B1_,_K%CE%B1

Rrogers314 (talk) 14:35, 9 December 2017 (UTC) [reply ]

It's obvious the written equation is wrong. The left-hand side doesn't contain t and the right-hand side doesn't seem to match DLMF. I will wait for other comments/references or edits before changing it though. Perhaps the author had some other formula completely in mind? [[1]] — Preceding unsigned comment added by Rrogers314 (talk • contribs) 14:40, 9 December 2017 (UTC) [reply ]

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