User talk:Dmitrii Kouznetsov/Analytic Tetration: Difference between revisions

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===Theorem T3===
===Theorem T3===
'''Let''' <math>~\phi=\frac{1+\sqrt{5}}{2}~</math>. </br>
'''Let''' <math>~\phi=\frac{1+\sqrt{5}}{2}~</math>. <br>
'''Let''' <math>~F(z+1)=F(z)+F(z-1)~</math>
'''Let''' <math>~F(z+1)=F(z)+F(z-1)~</math>
'''Let''' <math>~F(0)=1~</math>
'''Let''' <math>~F(0)=1~</math>
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'''Discussion'''. Id est, <math>~F~</math> is [[Fibbonachi function]].
'''Discussion'''. Id est, <math>~F~</math> is [[Fibbonachi function]].
===Theorem T4===
===Theorem T4===
'''Let''' <math>~b> \exp(1/\mathrm e)~</math>. <br>
'''Let''' <math>~b> \exp(1/\mathrm e)~</math>. <br>

Revision as of 05:27, 29 September 2008

Henryk Trappmann 's theorems

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

Theorem T1.

Let be holomorphic on the right half plane let for all such that .
Let .
Let be bounded on the strip .
Then is the gamma function.

Theorem T2

Let be solution of , , bounded in the strip .

Then is exponential on base , id est, .

Proof. We know that every other solution must be of the form where is a 1-periodic holomorphic function. This can roughly be seen by showing periodicity of .

,

where is also a 1-periodic function,

While each of and is bounded on , must be bounded too.

Theorem T3

Let .
Let Let Let

Then

Discussion. Id est, is Fibbonachi function.

Theorem T4

Let .
Let each of and satisfies conditions

for
is holomorphic function, bounded in the strip .

Then

Discussion. Such is unique tetration on the base .