Baby Mandelbrot sets and Spines in some one-dimensional subspaces of the parameter space for generalized McMullen Maps
Abstract
For the family of complex rational functions of the form Rn,c,a(z) = zn + azn+c, known as ``Generalized McMullen maps'', for a≠ 0 and n ≥ 3 fixed, we study the boundedness locus in some one-dimensional slices of the (a,c)-parameter space, by fixing a parameter or imposing a relation. First, if we fix c with |c|≥ 6 while allowing a to vary, assuming a modest lower bound on n in terms of |c|, we establish the location in the a-plane of n ``baby" Mandelbrot sets, that is, homeomorphic copies of the original Mandelbrot set. We use polynomial-like maps, introduced by Douady and Hubbard and applied for the subfamily Rn,a,0 by Devaney. Second, for slices in which c=ta, we again observe what look like baby Mandelbrot sets within these slices, and begin the study of this subfamily by establishing a neighborhood containing the boundedness locus.
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