Bifurcations in the Space of Exponential Maps

Abstract

This article investigates the parameter space of the exponential family z (z)+. We prove that the boundary (in ) of every hyperbolic component is a Jordan arc, as conjectured by Eremenko and Lyubich as well as Baker and Rippon. In fact, we prove the stronger statement that the exponential bifurcation locus is connected in , which is an analog of Douady and Hubbard's celebrated theorem that the Mandelbrot set is connected. We show furthermore that ∞ is not accessible through any nonhyperbolic ("queer") stable component. The main part of the argument consists of demonstrating a general "Squeezing Lemma", which controls the structure of parameter space near infinity. We also prove a second conjecture of Eremenko and Lyubich concerning bifurcation trees of hyperbolic components.

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