Fixed points of Feigenbaum's type for the equation \(f^ p(\lambda x)\equiv \lambda f(x)\) (Q1058768)
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scientific article; zbMATH DE number 3901696
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Fixed points of Feigenbaum's type for the equation \(f^ p(\lambda x)\equiv \lambda f(x)\) |
scientific article; zbMATH DE number 3901696 |
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Fixed points of Feigenbaum's type for the equation \(f^ p(\lambda x)\equiv \lambda f(x)\) (English)
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1984
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It is proved in the paper that the operator \({\mathcal N}_ p: f(x)\to \lambda^{-1}f^ p(\lambda,x)\), with \(f^ p\) p-fold iteration and \(\lambda =f^ p(0)\), has a fixed point in the special space of analytic functions, if p is sufficiently large. The fixed point, as a function of p, comes close to being quadratic function as p increases.
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iteration
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p-fold iteration
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fixed point
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