The existence of Zariski dense orbits for polynomial endomorphisms of the affine plane

Abstract

In this paper we prove the following theorem. Let f:A2→ A2 be a dominate polynomial endomorphisms defined over an algebraically closed field k of characteristic 0. If there are no nonconstant rational function g:A2-rightarrow P1 satisfying g f=g, then there exists a point p∈ A2(k) whose orbit under f is Zariski dense in A2. This result gives us a positive answer to a conjecture of Amerik, Bogomolov and Rovinsky ( and Zhang) for polynomial endomorphisms on the affine plane.