Nem(z)=z+z^3+qz^4
#2
(02/06/2016, 01:41 PM)Kouznetsov Wrote: Hello, colleagues.
I have constructed superfunction and abelfnction for the polynomial of special kind, Nem(z)=z+z^3+qz^4,
where q is positive parameter.

I load the description as

http://mizugadro.mydns.jp/2016NEMTSOV/TRY00/23.pdf
Dmitrii Kouznetsov.
Nemtsov function and its iterates.
2016, in preparation.

http://mizugadro.mydns.jp/t/index.php/Nemtsov_function

Could anybody criticise it?

Dimitrii,

This is an example of the parabolic case. There are some links on MSE to the fractional iterates for sin(x), which is a similar problem. In general, the Abel function and the fractional iterates are well known, and have a formal asymptotic series which turns out to have a zero radius of convergence. For example; see http://mathoverflow.net/questions/45608/...onvergence I have not seen the superfunction formal solution though.
- Sheldon


Messages In This Thread
Nem(z)=z+z^3+qz^4 - by Kouznetsov - 02/06/2016, 01:41 PM
RE: Nem(z)=z+z^3+qz^4 - by sheldonison - 02/06/2016, 11:06 PM
RE: Nem(z)=z+z^3+qz^4 - by Kouznetsov - 02/07/2016, 04:45 AM



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