Dynamical Anomalous Subvarieties: Structure and Bounded Height Theorems

Abstract

According to Medvedev and Scanlon, a polynomial f(x)∈ Q[x] of degree d≥ 2 is called disintegrated if it is not linearly conjugate to xd or Cd(x) (where Cd(x) is the Chebyshev polynomial of degree d). Let n∈N, let f1,…,fn∈ Q[x] be disintegrated polynomials of degrees at least 2, and let =f1×…× fn be the corresponding coordinate-wise self-map of ( P1)n. Let X be an irreducible subvariety of ( P1)n of dimension r defined over Q. We define the -anomalous locus of X which is related to the -periodic subvarieties of ( P1)n. We prove that the -anomalous locus of X is Zariski closed; this is a dynamical analogue of a theorem of Bombieri, Masser, and Zannier BMZ07. We also prove that the points in the intersection of X with the union of all irreducible -periodic subvarieties of ( P1)n of codimension r have bounded height outside the -anomalous locus of X; this is a dynamical analogue of Habegger's theorem Habegger09 which was previously conjectured in BMZ07. The slightly more general self-maps =f1×…× fn where each fi∈ Q(x) is a disintegrated rational map are also treated at the end of the paper.