Reduction, Dynamics, and Julia Sets of Rational Functions

We characterize the Julia sets of certain exponential functions. We show that the Julia sets J F λ n of F λ n z = λ n e z n where λ n > 0 is the whole plane , provided that lim k→∞ F k λ n 0 = ∞. In particular, this is true when λ n are real numbers such that λ n > 1 ne 1/n . On the other hand, if 0

## Abstract We give a lower bound of the hyperbolic and the Hausdorff dimension of the Julia set of meromorphic functions of finite order under very general conditions (© 2009 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)

A new criterion for starlikeness in the unit disc and an application to a certain class of rational functions are given.

From (1) it follows that y ( z ) has in zk a zero of order not less than vk . Since y ( z ) is holomorphic in the neighborhood of every point of %'K (including z = a), it follows from Hypothesis 6, that y ( z ) vanishes identically in VK. On the other hand, we have for large IzJ of 5. 1 We say tha