Difference between revisions of "Perturbed Fatou coordinates"

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I will use [[Shishikura_perturbed_Fatou_coordinates|this (emerging) page]] to quote Shishikura, and use perhaps this article to draw some conclusions later.
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While [[Fatou coordinates]] are the (injective parts of the) [[principal Abel function]]s of a holomorphic function $f$ at a given fixpoint,
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for simplicity this fixpoint is assumed to be at 0:
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$$f(z)= z + c_{m+1} z^{m+1} + o(z^{m+1}),$$
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'perturbed' Fatou coordinates refer to a function that is 'disturbed' by some small $c_0\in\C$:
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$$f(z)=c_0 + z + c_{m+1} z^{m+1} + o(z^{m+1})$$
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This function usually has $2m$ fixpoints in a vicinity of 0.
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For the details of the case $m=1$ I refer to [[Shishikura_perturbed_Fatou_coordinates|Shishikuras presentation]].

Revision as of 11:34, 5 June 2011

While Fatou coordinates are the (injective parts of the) principal Abel functions of a holomorphic function $f$ at a given fixpoint, for simplicity this fixpoint is assumed to be at 0: $$f(z)= z + c_{m+1} z^{m+1} + o(z^{m+1}),$$

'perturbed' Fatou coordinates refer to a function that is 'disturbed' by some small $c_0\in\C$: $$f(z)=c_0 + z + c_{m+1} z^{m+1} + o(z^{m+1})$$

This function usually has $2m$ fixpoints in a vicinity of 0.

For the details of the case $m=1$ I refer to Shishikuras presentation.