Criteria for $f(f(x))=g(x)$

Asked Oct 03 '19 at 07:47

Active Oct 03 '19 at 10:40

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I 'm searching about the solvability of the functional equation $f(f(x))=g(x)$. I have three questions about it:

Let's be $g$ an arbitrary function and the functional equation $f(f(x))=g(x)$. Are there any specific criteria to ensure us that there exist such function $f$?
Let's be $g\in C^0$ and the functional equation $f(f(x))=g(x)$. Are there any specific criteria to ensure us that there exist such function $f$ and $f\in C^0$?
Let's be $g\in C^1$ and the functional equation $f(f(x))=g(x)$. Are there any specific criteria to ensure us that there exist such function $f$ and $f\in C^1$?

Thanks in advance!

P.S.: I read this and this, but there are a little bit different questions.

edited Oct 03 '19 at 10:40

R.P.

asked Oct 03 '19 at 07:47

The question may be too broad. Do you have any specific examples in mind? – LeechLattice Oct 03 '19 at 08:26
3

The answer in 1 would be Ulm invariants. See my answer https://mathoverflow.net/a/17869/454 – Gerald Edgar Oct 03 '19 at 09:20
@Bullet51 , I hope that there will be something like the discriminant on the quadratic equations. – Kώστας Κούδας Oct 06 '19 at 11:06
@GeraldEdgar , thanks for your answer!!! – Kώστας Κούδας Oct 06 '19 at 11:06

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