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Hausdorff Dimension of Sets of Escaping Points and Escaping Parameters for Elliptic Functions

Published online by Cambridge University Press:  30 December 2015

Piotr Gałązka
Affiliation:
Faculty of Mathematics and Information Science, Warsaw University of Technology, ul. Koszykowa 75, 00-662 Warszawa, Poland ([email protected]; [email protected])
Janina Kotus
Affiliation:
Faculty of Mathematics and Information Science, Warsaw University of Technology, ul. Koszykowa 75, 00-662 Warszawa, Poland ([email protected]; [email protected])

Abstract

Let be a non-constant elliptic function. We prove that the Hausdorff dimension of the escaping set of f equals 2q/(q+1), where q is the maximal multiplicity of poles of f. We also consider the escaping parameters in the family fβ = βf, i.e. the parameters β for which the orbit of one critical value of fβ escapes to infinity. Under additional assumptions on f we prove that the Hausdorff dimension of the set of escaping parameters ε in the family fβ is greater than or equal to the Hausdorff dimension of the escaping set in the dynamical space. This demonstrates an analogy between the dynamical plane and the parameter plane in the class of transcendental meromorphic functions.

Type
Research Article
Copyright
Copyright © Edinburgh Mathematical Society 2015 

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References

1. Baránski, K., Hausdorff dimension of hairs and ends for entire maps of finite order, Math. Proc. Camb. Phil. Soc. 145 (2008), 719737.Google Scholar
2. Bergweiler, W., On the packing dimension of the Julia set and the escaping set of an entire function, Israel J. Math. 192 (2012), 449472.Google Scholar
3. Bergweiler, W. and Kotus, J., On the Hausdorff dimension of the escaping set of certain meromorphic functions, Trans. Am. Math. Soc. 364 (2012), 53695394.Google Scholar
4. Domínguez, P., Dynamics of transcendental meromorphic functions, Annales Acad. Sci. Fenn. Math. 23 (1998), 225250.Google Scholar
5. Hawkins, J. and Koss, L., Ergodic properties and Julia sets of Weierstrass elliptic functions, Monatsh. Math. 137(4) (2002), 273300.Google Scholar
6. Hawkins, J. and Koss, L., Connectivity properties of Julia sets of Weierstrass elliptic functions, Topol. Applic. 152 (2005), 107137.CrossRefGoogle Scholar
7. Karpińska, B., Area and Hausdorff dimension of the set of accessible points of the Julia sets of ƛe z and ƛ sin z , Fund. Math. 159 (1999), 269287.Google Scholar
8. Kotus, J., On the Hausdorff dimension of Julia sets of meromorphic functions, II, Bull. Soc. Math. France 123 (1995), 3346.Google Scholar
9. Kotus, J.and Urbański, M., Hausdorff dimension and Hausdorff measures of Julia sets of elliptic functions, Bull. Lond. Math. Soc. 35 (2003), 269275.Google Scholar
10. Kotus, J. and Urbański, M., Geometry and ergodic theory of non-recurrent elliptic functions, J. Analysis Math. 93 (2004), 35102.Google Scholar
11. Kotus, J. and Urbański, M., Ergodic theory, geometric measure theory and the dynamics of elliptic functions, Preprint (available at http://www.mini.pw.edu.pl/~kotus/www/pdf/NCP_2013.11.22.pdf).Google Scholar
12. McMullen, C., Area and Hausdorff dimension of Julia sets of entire functions, Trans. Am. Math. Soc. 300 (1987), 329342.Google Scholar
13. Qiu, W., Hausdoff Dimension of the M-Set of ƛ exp(z), Acta Math. Sinica 10 (1994), 362368.Google Scholar
14. Rippon, P. J. and Stallard, G. M., Escaping points of meromorphic functions with a finite number of poles, J. Analysis Math. 96 (2005), 225245.Google Scholar
15. Rippon, P. J. and Stallard, G. M., Fast escaping points of entire functions, Proc. Lond. Math. Soc. 105 (2012), 787820.Google Scholar