Jan Kiwi
Published 2012-11-14Version 1
We discuss rescaling limits for sequences of complex rational maps in one variable which approach infinity in parameter space.It is shown that any given sequence of maps of degree $d \ge 2$ has at most $2d-2$ dynamically distinct rescaling limits which are not postcritically finite. For quadratic rational maps, a complete description of the possible rescaling limits is given. These results are obtained employing tools from non-Archimedean dynamics.
Quadratic rational maps with a $2$-cycle of Siegel disks
Asymptotics of Transversality in Periodic Curves of Quadratic Rational Maps
Rescaling Limits in Non-Archimedean Dynamics
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