Existence of non-preperiodic algebraic points for a rational self-map of infinite order

Abstract

Let X be a variety defined over a number field and f be a dominant rational self-map of X of infinite order. We show that X admits many algebraic points which are not preperiodic under f. If f were regular and polarized, this would follow immediately from the theory of canonical heights, but it does not work very well for rational self-maps. We provide an elementary proof following an argument by Bell, Ghioca and Tucker (arxiv:0808.3266).