arXiv:math/9812164 Abstract

arXiv:math/9812164 [math.DS]Abstract References Reviews Resources

Holomorphic Removability of Julia Sets

Published 1998-12-31Version 1

Let $f(z) = z^2 + c$ be a quadratic polynomial, with c in the Mandelbrot set. Assume further that both fixed points of f are repelling, and that f is not renormalizable. Then we prove that the Julia set J of f is holomorphically removable in the sense that every homeomorphism of the complex plane to itself that is conformal off of J is in fact conformal on the entire complex plane. As a corollary, we deduce that the Mandelbrot Set is locally connected at such c.

Comments: 48 pages. 9 PostScript figures

Categories: math.DS, math.CV

Keywords: julia set, holomorphic removability, mandelbrot set, entire complex plane, quadratic polynomial

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Holomorphic Removability of Julia Sets

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