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CONFORMAL CONJUGACIES IN BAKER DOMAINS

Published online by Cambridge University Press:  01 February 1999

HARALD KÖNIG
Affiliation:
Institut für Mathematik, Universität Hannover, Postfach 6009, D-30060 Hannover, Germany
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Abstract

Let F be a meromorphic function in the complex plane. We investigate the behaviour of the iterates of F in a Baker domain B. In particular, we describe the dynamics of the orbits with the help of conformal conjugacies; that is, we determine a function φ which is univalent in a large simply connected subdomain of B such that φ(F(z))=T(φ(z)) holds throughout B. Here T is either a parabolic or hyperbolic Möbius transformation mapping either a half plane or [Copf ] onto itself. This functional equation is always solvable in a Baker domain if F has only finitely many poles. Moreover, there is an example of a function with infinitely many poles where one cannot find an appropriate conformal conjugacy in an invariant Baker domain.

Type
Notes and Papers
Copyright
The London Mathematical Society 1999

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