A lower bound on the orbit growth of a regular self-map of affine space

Abstract

We show that if f : AQr AQr is a regular self-map and P ∈ Ar(Q) has n ∈ N haff(fnP)n < 1/r, where haff is the affine Weil height, then N partitions into a finite set and finitely many full arithmetic progressions, on each of which the coordinates of fnP are polynomials in n. In particular, if (fnP)n ∈ N is a Zariski-dense orbit, then either n = 1 and f is of the shape t ζ t + c, ζ ∈ μ∞, or else n ∈ N haff(fnP)n ≥ 1/r. This inequality is the exponential improvement of the trivial lower bound obtained from counting the points of bounded height in Ar(K).