The size of the Julia set of meromorphic functions

## Abstract Some conditions on the size of the exceptional set that arise in Nevanlinna's Second Fundamental Theorem are established, showing that previous sharp results can be improved by restricting the class of functions considered and suggesting a close relationship between the size of the exce

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

Let Q be the class of functions of the form f z s y1rz q c q c z q иии 0 1 < < which are meromorphic in the unit disk z -1 and satisfy there the condition Ž . Ä 4 Ä Ž .4 f z / 0 and ᑣ z и ᑣ f z ) 0 for nonreal z. We determine the radius of starlikeness of order ␣, yϱ -␣ -1, and the maximal domain o

Let f and h be transcendental meromorphic and g a transcendental entire function. It is shown that if h grows slower than g in a suitable sense, then there Ž . Ž Ž .. Ž . exists an unbounded sequence z such that f g z s h z . ᮊ 2001 Academic n n n Press 1 Supported by Deutscher Akademischer Austausc

We consider a rational function ,(z) # K(z) in one variable defined over an algebraically closed field K which is complete with respect to a valuation v. We study how the reduction (modulo v) of such functions behaves under composition, and in particular under iteration. We also investigate the rela