Dzmitry Dudko
Published 2011-12-20Version 1
We give a topological description of the space of quadratic rational maps with superattractive two-cycles: its "non-escape locus" M2 (the analog of the Mandelbrot set M) is locally connected, it is the continuous image of M under a canonical map, and it can be described as M (minus the 1/2-limb), mated with the lamination of the basilica. The latter statement is a refined version of a conjecture of Ben Wittner, which in its original version requires local connectivity of M to even be stated. Our methods of mating with a lamination also apply to dynamical matings of certain non-locally connected Julia sets.
Local connectivity of boundaries of tame Fatou components of meromorphic functions
Asymptotics of Transversality in Periodic Curves of Quadratic Rational Maps
Quadratic rational maps with a $2$-cycle of Siegel disks
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