Semi-parabolic tools for hyperbolic H\'enon maps and continuity of Julia sets in C2

Abstract

We prove some new continuity results for the Julia sets J and J+ of the complex H\'enon map Hc,a(x,y)=(x2+c+ay, ax), where a and c are complex parameters. We look at the parameter space of dissipative H\'enon maps which have a fixed point with one eigenvalue (1+t)λ, where λ is a root of unity and t is real and small in absolute value. These maps have a semi-parabolic fixed point when t is 0, and we use the techniques that we have developed in [RT] for the semi-parabolic case to describe nearby perturbations. We show that for small nonzero |t|, the H\'enon map is hyperbolic and has connected Julia set. We prove that the Julia sets J and J+ depend continuously on the parameters as t→ 0, which is a two-dimensional analogue of radial convergence from one-dimensional dynamics. Moreover, we prove that this family of H\'enon maps is stable on J and J+ when t is nonnegative.