Geometric limits of Mandelbrot and Julia sets under degree growth
Abstract
First, for the family Pn,c(z) = zn + c, we show that the geometric limit of the Mandelbrot sets Mn(P) as n tends to infinity exists and is the closed unit disk, and that the geometric limit of the Julia sets J(Pn,c) as n tends to infinity is the unit circle, at least when the modulus of c is not one. Then we establish similar results for some generalizations of this family; namely, the maps Ft,c (z) = zt+c for real t>= 2, and the rational maps Rn,c,a (z) = zn + c + a/zn.
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