Difference between revisions of "Theorem on increment of tetration"
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[[Theorem on increment of superfunctions]]is statement about asymptotic behavior of solution of the [[Transfer equation]]. |
[[Theorem on increment of superfunctions]]is statement about asymptotic behavior of solution of the [[Transfer equation]]. |
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Let \(F\) be solution of equation |
Let \(F\) be solution of equation |
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Revision as of 01:22, 11 August 2020
Theorem on increment of superfunctionsis statement about asymptotic behavior of solution of the Transfer equation.
Statement
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
\( \Im(K) = \Im(k) \)
References