On the inhomogeneity of the Mandelbrot set
Abstract
We will show the Mandelbrot set M is locally conformally inhomogeneous: the only conformal map f defined in an open set U intersecting ∂ M and satisfying f(U∂ M)⊂ ∂ M is the identity map. The proof uses the study of local conformal symmetries of the Julia sets of polynomials: we will show in many cases, the dynamics can be recovered from the local conformal structure of the Julia sets.
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