Difference between revisions of "Theorem on increment of tetration"
Jump to navigation
Jump to search
(Created page with "Theorem on increment of superfunctionsis statement about asymptotic behavior of solution of the Transfer equation. Let \(F\) be solution of equation \(F(z\!+\!1)=\ex...") |
|||
| Line 24: | Line 24: | ||
<references/> |
<references/> |
||
| + | [[Category:Kneser expansion]] |
||
[[Category:Superfunction]] |
[[Category:Superfunction]] |
||
[[Category:Tetration]] |
[[Category:Tetration]] |
||
Revision as of 01:19, 11 August 2020
Theorem on increment of superfunctionsis statement about asymptotic behavior of solution of the Transfer equation.
Let \(F\) be solution of equation
\(F(z\!+\!1)=\exp\big(\beta F(z)\big)\)
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 \(~ K\!=\!\exp(k)\)
Then
\( \Im(K) = \Im(k) \)