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Golden mean Siegel disk universality and renormalization

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arxiv 1604.00717 v4 pith:Q5MMOMTT submitted 2016-04-04 math.DS

Golden mean Siegel disk universality and renormalization

classification math.DS
keywords renormalizationsiegeldiskgolden-meanboundarymapsone-dimensionaluniversality
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We provide a computer-assisted proof of one of the central open questions in one-dimensional renormalization theory -- universality of the golden-mean Siegel disks. We further show that for every function in the stable manifold of the golden-mean renormalization fixed point the boundary of the Siegel disk is a quasicircle which coincides with the closure of the critical orbit, and that the dynamics on the boundary of the Siegel disk is rigid. Furthermore, we extend the renormalization from one-dimensional analytic maps with a golden-mean Siegel disk to two-dimensional dissipative H\'enon-like maps and show that the renormalization hyperbolicity result still holds in this setting.

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    Proves existence of the C-type renormalisation two-cycle in a Banach space of analytic maps with rigorous bounds on state-space scaling constants.