On PZ type Siegel disks of the sine family (Q2805070)

The author proves rigorously that, for typical rotation numbers \(0 < \theta< 1\), the boundary of the Siegel disk of \(f_{\theta}(z) = e^{2\pi i \theta} \sin (z)\) centered at the origin is a Jordan curve which passes through exactly two critical points, \(\pi / 2\) and \(-\pi /2\). Here \(\theta\) is of Petersen-Zakari type and \([a_{1}, a_{2}, \dots, a_{n}, \dots]\) is its continued fraction. The author says that \(\theta\) is of bounded type if \(\sup \{a_{n}\}< \infty\). The author gives many interesting lemmas to prove his main result. The author also introduces David's homeomorphisms and David's integrability theorem and proposes a way to verify the integrability of the invariant Beltrami differentials for some Blaschke models for which Petersen's puzzle construction is not available. The author constructs an odd Blaschke fraction as a model map for \(f_{\theta}\).