Rigidity of the escaping set of certain H\'enon maps

Abstract

Let H be a H\'enon map of the form H(x,y)=(y,p(y)-ax). We prove that the escaping set U+ (or equivalently, the non-escaping set K+), of H is rigid under the actions of automorphisms of C2 if the degree of H=d |a|. Specifically, every automorphism of C2 that preserves U+, essentially takes the form C Hs where s ∈ Z, and C(x,y)=(η x, ηd y) with η some (d2-1)-root of unity. Consequently, we show that the automorphisms of the short C2's, obtained as the sub-level sets of the (positive) Green's function corresponding to the H\'enon map H for strictly positive values, are essentially linear maps of C2 preserving the escaping set U+. Hence, the automorphism groups of these short C2's are the same, finite, and form a subgroup of Zd2-1.

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