The Brjuno function continuously estimates the size of quadratic Siegel disks

Details The Brjuno function continuously estimates the size of quadratic Siegel disks The Brjuno function continuously estimates the size of quadratic Siegel disks

2004-01-06

arxiv.org/abs/math/0401044v1

Mathematics

Dynamical Systems

32 pages, 5 figures

Scientific paper

If alpha is an irrational number, we define Yoccoz's Brjuno function Phi by Phi(alpha)=sum_{n geq 0} alpha_0*alpha_1*...*alpha_{n-1}*log(1/alpha_n), where alpha_0 is the fractional part of alpha and alpha_{n+1} is the fractional part of 1/alpha_n. The numbers alpha such that Phi(alpha) e^{2i pi alpha}z+z^2 has an indifferent fixed point at the origin. If P_alpha is linearizable, we let r(alpha) be the conformal radius of the Siegel disk and we set r(alpha)=0 otherwise. Yoccoz proved that Phi(alpha)=infty if and only if r(alpha)=0 and that the restriction of alpha -> Phi(alpha)+log r(alpha) to the set of Brjuno numbers is bounded from below by a universal constant. We proved that it is also bounded from above by a universal constant. In fact, Marmi, Moussa and Yoccoz conjecture that this function extends to $R$ as a H\"older function of exponent 1/2. In this article, we prove that there is a continuous extension to $R$.

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