Lasse Rempe, Dierk Schleicher
Published 2004-08-02, updated 2005-09-28Version 2
We give a complete combinatorial description of the bifurcation structure in the space of exponential maps $z\mapsto\exp(z)+\kappa$. This combinatorial structure is the basis for a number of important results about exponential parameter space. These include the fact that every hyperbolic component has connected boundary, a classification of escaping parameters, and the fact that all dynamic and parameter rays at periodic addresses land.
Comments: 48 pages, 5 figures. V2: The article (particularly Section 6 and 7) was revised to improve the exposition; some figures were added. This may have changed the numbers of references to this article in other papers. In this case, please refer to the previous version of the article
Journal: In: Transcendental dynamics and complex analysis. In honour of Noel Baker (Rippon and Stallard, eds); London Mathematical Society Lecture Note Series 348, 317-370 (2008).
Bifurcation Loci of Exponential Maps and Quadratic Polynomials: Local Connectivity, Triviality of Fibers, and Density of Hyperbolicity
Bifurcations in the Space of Exponential Maps
Hyperbolic Components in Exponential Parameter Space
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