Further remarks on rigidity of H\'enon maps

Abstract

For a H\'enon map H in C2, we characterize the polynomial automorphisms of C2 which keep any fixed level set of the Green function of H completely invariant. The interior of any non-zero sublevel set of the Green function of a H\'enon map turns out to be a Short C2 and as a consequence of our characterization, it follows that there exists no polynomial automorphism apart from possibly the affine automorphisms which acts as an automorphism on any of these Short C2's. Further, we prove that if any two level sets of the Green functions of a pair of H\'enon maps coincide, then they almost commute.