User talk:Dmitrii Kouznetsov/Analytic Tetration

Henryk Trappmann 's theorems

This is approach to the Second part of the Theorem 0, which is still absent in the main text.

Copypast from http://math.eretrandre.org/tetrationforum/showthread.php?tid=165&pid=2458#pid2458

Theorem T1. (about Gamma function)

Let ${\displaystyle ~F~}$ be holomorphic on the right half plane let ${\displaystyle ~F(z+1)=zF(z)~}$ for all ${\displaystyle ~z~}$ such that ${\displaystyle ~\Re (z)>0~}$.
Let ${\displaystyle ~F(1)=1~}$.
Let ${\displaystyle F}$ be bounded on the strip ${\displaystyle ~1\leq \Re (z)<2~}$.
Then ${\displaystyle ~F~}$ is the gamma function.

Proof, see in Reinhold Remmert, "Funktionnentheorie", Springer, 1995. As reference is given: H. Wielandt 1939. (Mein Gott, so old reference!)

Consider function ${\displaystyle ~v=F-\Gamma ~}$ on the right half plane, it also satisfies equation ${\displaystyle ~v(z+1)~=~z~v(z)~}$ Hence, ${\displaystyle ~v~}$ has a meromorphic continuation to ${\displaystyle ~\mathbb {C} ~}$; and the poles are allowed only at non–positive integer values of the argument.

While ${\displaystyle ~v(1)=0~}$, we have ${\displaystyle ~\lim _{z\rightarrow 0}z~v(z)=0~}$, hence, ${\displaystyle ~v~}$ has a holomorphic continuation to 0 and also to each ${\displaystyle ~-n~}$, ${\displaystyle ~n\in \mathbb {N} }$ by ${\displaystyle ~v(z+1)=z~v(z)~}$.

In the range ${\displaystyle ~1\leq \Re (z)<2~}$, ${\displaystyle ~v(z)~}$ is pounded. It is because function ${\displaystyle ~\Gamma ~}$ is bounded there.

Then ${\displaystyle ~v(z)~}$ is also restricted on ${\displaystyle ~\mathbb {S} ~}$, because ${\displaystyle ~v(z)!}$ and ${\displaystyle ~v(1-z)!}$ have the same values on ${\displaystyle ~\mathbb {S} ~}$. Now ${\displaystyle ~q(z+1)=-q(z)~}$, hence ${\displaystyle ~q~}$ is bounded on whole ${\displaystyle ~\mathbb {C} ~}$, and by the Liouville Theorem, ${\displaystyle ~q(z)=q(1)=0}$. Hence, ${\displaystyle ~v=0~}$ and ${\displaystyle ~F=\Gamma ~}$.

(end of proof)

Theorem T2 (about exponential)

Let ${\displaystyle ~E~}$ be solution of ${\displaystyle ~E(z+1)=bE(x)~}$, ${\displaystyle ~E(1)=b~}$, bounded in the strip ${\displaystyle ~0\leq \Re (z)<1~}$.

Then ${\displaystyle ~E~}$ is exponential on base ${\displaystyle ~b~}$, id est, ${\displaystyle ~E=\exp _{b}~}$.

Proof. We know that every other solution must be of the form ${\displaystyle ~g(z)=f(z+p(z))~}$ where ${\displaystyle ~p~}$ is a 1-periodic holomorphic function. This can roughly be seen by showing periodicity of ${\displaystyle ~h(z)=f^{-1}(g(z))-z~}$.

${\displaystyle ~f(z+p(z))=b^{z+p(z)}=b^{p(z)}b^{z}=b^{p}(z)f(z)~=q(z)f(z)~}$,

where ${\displaystyle ~q(z)=b^{p}(z)~}$ is also a 1-periodic function,

While each of ${\displaystyle ~f~}$ and ${\displaystyle ~g~}$ is bounded on ${\displaystyle ~\mathbb {S} ~}$, ${\displaystyle ~q~}$ must be bounded too.

Theorem T3 (about Fibbonachi)

Let ${\displaystyle ~\phi ={\frac {1+{\sqrt {5}}}{2}}~}$.
Let ${\displaystyle ~F(z+1)=F(z)+F(z-1)~}$ Let ${\displaystyle ~F(0)=1~}$ Let ${\displaystyle ~F(1)=1~}$

Then ${\displaystyle ~F(z)={\frac {\phi ^{z}-(1-\phi )^{z}}{\sqrt {5}}}}$

Discussion. Id est, ${\displaystyle ~F~}$ is Fibbonachi function.

Theorem T4 (about tetration)

First intent to formulate

Let ${\displaystyle ~b>\exp(1/\mathrm {e} )~}$.
Let each of ${\displaystyle ~F_{1}~}$ and ${\displaystyle ~F_{2}~}$ satisfies conditions

${\displaystyle ~\exp _{b}(F(z))=F(z+1)~}$ for ${\displaystyle \Re (z)>-2}$

${\displaystyle ~F(z)~}$ is holomorphic function, bounded in the strip ${\displaystyle ~|\Re (z)|\leq 1~}$ .

Then ${\displaystyle ~F_{1}=F_{2}~}$

Second intent to formulate

(0) Let ${\displaystyle ~b>\exp(1/\mathrm {e} )~}$.

(1) Let each of ${\displaystyle ~F_{1}~}$ and ${\displaystyle ~F_{2}~}$ is holomorphic function on ${\displaystyle ~\mathbb {C} ^{\prime }=\mathbb {C} \backslash (-\infty ,-2]}$,

satisfying conditions

(2) ${\displaystyle F(0)=1}$

(3) ${\displaystyle ~\exp _{b}(F(z))=F(z+1)~}$ for ${\displaystyle \Re (z)>-2}$

(4) ${\displaystyle ~F~}$ is bounded on ${\displaystyle ~\mathbb {S} =~\{x+\mathrm {i} y|-2<x\leq 1,y\in \mathbb {R} \}}$

Then ${\displaystyle ~F_{1}=F_{2}~}$

Proof of Theorem T4

Lemma 1

(0) Let ${\displaystyle ~b>\exp(1/\mathrm {e} )~}$.

(1) Let ${\displaystyle ~f~}$ be holomorphic function on ${\displaystyle ~\mathbb {C} ^{\prime }=\mathbb {C} \backslash (-\infty ,-2]}$, such that

(2) ${\displaystyle f(0)=1}$

(3) ${\displaystyle ~\exp _{b}(f(z))=f(z+1)~}$ for ${\displaystyle \Re (z)>-2}$

(4) ${\displaystyle ~f~}$ is bounded on ${\displaystyle ~\mathbb {S} =~\{x+\mathrm {i} y|-2<x\leq 1,y\in \mathbb {R} \}}$

Let ${\displaystyle \mathbb {D} =\{~\{x+\mathrm {i} y|-2<x,y\in \mathbb {R} \}}$

Then ${\displaystyle f(\mathbb {D} )=\mathbb {C} ~}$

Proof of Lemma 1

Proof of theorem T4

Discussion

Such ${\displaystyle ~F~}$ is unique tetration on the base ${\displaystyle ~b~}$.