Dynamics of semigroups of H\'enon maps

Abstract

The goal of this article is two fold. Firstly, we explore the dynamics of a semigroup of polynomial automorphisms of C2, generated by a finite collection of H\'enon maps. In particular, we construct the positive and negative dynamical Green's functions GG and the corresponding dynamical Green's currents μG for a semigroup S, generated by a collection G. Using them, we show that the positive (or negative) Julia set of the semigroup S, i.e., JS+ (or JS-) is equal to the closure of the union of individual positive (or negative) Julia sets of the maps, in the semigroup S. Furthermore, we prove that μG+ is supported on the whole of JS+ and is also the unique positive closed (1,1)-current supported on JS+, satisfying a semi-invariance relation that depends on the generating set G. Secondly, we study the dynamics of a non-autonomous sequence of H\'enon maps, say \hk\, contained in the semigroup S. Similarly, as above, here too, we construct the non-autonomous dynamical positive and negative Green's function and the corresponding dynamical Green's currents. Further, we use the properties of Green's function to conclude that the non-autonomous attracting basin of any such sequence \hk\, sharing a common attracting fixed point, is biholomorphic to C2.