Theorem on increment of tetration
Theorem on increment of tetration is statement about asymptotic behavior of solution of the Transfer equation with exponential transfer functions. It applies not only to tetration, but also to other superexponentials.
Let \(F\) be solution of equation
for some \(\beta>0\).
Let \(L\) be the fixed point, id est, \(\exp(\beta L)=L\)
Let \(F(z)=L+\varepsilon+O(\varepsilon^2) \)
where \(\varepsilon = \exp(kz) \) for some increment \(k\).
Let \(~ K\!=\!\exp(k)\)
\( \Im(K) = \Im(k) \)
Fig.1. Asymptoric parameters of Tetration versus \(\beta\)
Fig.1 shows the asymptotic parameters of tetration to base \(\ln(\beta)\):
Real and imaginary parts of the fixed points
Real and imaginary parts of the asymptotic growing factor
\(K= \beta L\)
Real and imaginary parts of the asymptotic increment
For \(\beta < 1/\mathrm e\), the two fixed points are shown; and the two values of the corresponding growing factor and two values of the corresponding increment are drown.
For real positive \(\beta\),
The imaginary parts of \(K\) and \(k\) coincide.
https://www.morebooks.de/store/gb/book/superfunctions/isbn/978-620-2-67286-3 Dmitrii Kouznetsov. Superfunctions. Lambert Academic Publishing, 2020.