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Singular values and bounded Siegel disks

Published online by Cambridge University Press:  25 May 2017

ANNA MIRIAM BENINI  and
NÚRIA FAGELLA
ANNA MIRIAM BENINI
Affiliation:
Dip. di Matematica, Universita' di Tor Vergata, Via della Ricerca Scientifica, 00133 Roma, Italy. e-mail: [email protected]
NÚRIA FAGELLA
Affiliation:
Dept. de Matemàtiques i Informàtica, Barcelona Graduate School of Mathematics (BGSMath), Gran Via 585, 08007 Barcelona, Spain. e-mail: [email protected]
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Abstract

Let f be an entire transcendental function of finite order and Δ be a forward invariant bounded Siegel disk for f with rotation number in Herman's class $\mathcal{H}$. We show that if f has two singular values with bounded orbit, then the boundary of Δ contains a critical point. We also give a criterion under which the critical point in question is recurrent. We actually prove a more general theorem with less restrictive hypotheses, from which these results follow.

Type
Research Article
Information
Mathematical Proceedings of the Cambridge Philosophical Society , Volume 165 , Issue 2 , September 2018 , pp. 249 - 265
Copyright
Copyright © Cambridge Philosophical Society 2017 

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References

REFERENCES

[BF]Benini, A. M. and Fagella, N. A separation theorem for entire transcendental maps. Proc. Lon. Math. Soc. 110 (2015), 291324.Google Scholar
[Be]Bergweiler, W. Iteration of meromorphic functions. Bull. Amer. Math. Soc. (N.S.) 29 (1993), no. 2, 151188.Google Scholar
[BE]Bergweiler, W. and Eremenko, A. On the singularities of the inverse of a meromorphic function of finite order. Rev. Mat. Iberoamericana 11 (1995), no. 2, 355-373.Google Scholar
[Bi]Bishop, C. J. Constructing entire functions by quasiconformal folding. Acta Math. 214 (2015), 160.Google Scholar
[Ch]Chéritat, A. Relatively compact Siegel disks with non-locally connected boundaries. Math. Ann. 349 (2011), 529542.Google Scholar
[CR]Chéritat, A. and Roesch, P. Herman's condition and Siegel disks of bi-critical polynomials. Comm. Math. Phys. 344 (2016), no. 2, 397426.Google Scholar
[De]Deniz, A. A landing theorem for periodic dynamic rays for transcendental entire maps with bounded post-singular set. J. Difference Equ. Appl. 20 (2014), 16271640.Google Scholar
[EL]Eremenko, A. and Lyubich, M. Dynamical properties of some classes of entire functions. Ann. Inst. Fourier (Grenoble) 42 (1992), no. 4, 9891020.Google Scholar
[Fa]Fagella, N. Dynamics of the complex standard family. J. Math. Anal. Appl. 229 (1999), no. 1, 131.Google Scholar
[Gh]Ghys, E. Transformations holomorphes au voisinage d'une courbe de Jordan. C.R. Acad. Sc. Paris 289 (1984), 383388.Google Scholar
[GK]Goldberg, L. and Keen, L. A finiteness theorem for a dynamical class of entire functions. Ergodic Theory Dynam. Systems 6 (1986) no. 2, 183192.Google Scholar
[GM]Goldberg, L. and Milnor, J. Fixed points of polynomial maps. Part II. Fixed point portraits. Ann. Sci. École Norm. Sup. (4) 26 (1993), no. 1, 5198.Google Scholar
[GS]Graczyk, J. and Światek, G. Siegel disks with critical points on their boundaries. Duke Math. J. 119 (2003), no.3, 189196.Google Scholar
[Ha]Hatcher, A. Algebraic Topology (Cambridge University Press, Cambridge, 2002).Google Scholar
[He1]Herman, M.-R. Sur la conjugaison différentiable des difféomorphismes du cercle á des rotations. Inst. Hautes Études Sci. Publ. Math. 49, (1979) 5233.Google Scholar
[He2]Herman, M. R. Are there critical points on the boundaries of singular domains? Comm. Math. Phys. 99 (1985), no. 4, 593612.Google Scholar
[He3]Herman, M. Conjugaison quasi-symétrique des difféphismes du cercle et applications aux disques singuliers de Siegel, manuscript (1986).Google Scholar
[He4]Herman, M. Conjugaison quasi-symétrique des homeomorphismes analytiques du cercle à des rotations, manuscript (1987).Google Scholar
[Iv]Iversen, F. Recherches sur les fonctions inverses. Comptes Rendus 143 (1906), 877879; Math Werke, no. 1, 655–656.Google Scholar
[Ma1]Mañé, R. Hyperbolicity, sinks and measure in one-dimensional dynamics. Comm. Math. Phys. 100 (1985), no. 4 495524.Google Scholar
[Ma2]Mañé, R. Erratum: Hyperbolicity, sinks and measure in one-dimensional dynamics. Comm. Math. Phys. 112 (1987), no. 4, 721724.Google Scholar
[Ma3]Mañé, R. On a theorem of Fatou. Bol. Soc. Brasil. Mat. (N.S.) 24 (1993), no. 1, 111.Google Scholar
[Mi]Milnor, J. Dynamics in one complex variable. Ann. of Math. Stud. (2006), Princeton University Press.Google Scholar
[Re1]Rempe, L. Dynamics of Exponential Maps, doctoral thesis, Christian-Albrechts-Universität Kiel (2003) http://http://eldiss.uni-kiel.de/macau/receive/dissertation_diss_00000781.Google Scholar
[Re2]Rempe, L. On a question of Herman, Baker and Rippon concerning Siegel disks. Bull. Lon. Math. Soc. 36 (2004), 516518.Google Scholar
[Re3]Rempe, L. A landing theorem for periodic rays of exponential maps. Proc. Amer. Math. Soc. 134 (9) (2006), 26392648.Google Scholar
[Re4]Rempe, L. Siegel disks and periodic rays of entire functions. J. Reine Angew. Math. 624 (2008), 81102.Google Scholar
[RvS]Rempe, L. and Van Strien, S. Absence of line fields and Mañé's theorem for non-recurrent transcendental functions. Trans. Amer. Math. Soc. 363 (2011), no. 1, 203228.Google Scholar
[R3S]Rottenfusser, G., Rückert, J., Rempe, L. and Schleicher, D. Dynamic rays of bounded-type entire functions. Ann. of Math. 173 (2010), 77125.Google Scholar
[Ro]Rogers, J. T. Diophantine conditions imply critical points on the boundaries of Siegel disks of polynomials. Comm. Math. Phys. 195 (1998), no. 1, 175193.Google Scholar
[Yo]Yoccoz, J.-C. Analytic linearisation of circle diffeomorphisms. Dynamical systems and small divisors (Cetraro, 1998), Lecture notes in Math. vol. 1784 (Springer, Berlin 2002), 125173.Google Scholar
[Yn]Yoneyama, K. Theory of continuous set of points. Tohoku Math. J. 12 (1917), 43158.Google Scholar