Height Estimates for Equidimensional Dominant Rational Maps

Abstract

Let F : W --> V be a dominant rational map between quasi-projective varieties of the same dimension. We give two proofs that hV(F(P)) >> hW(P) for all points P in a nonempty Zariski open subset of W. For dominant rational maps F : Pn --> Pn, we give a uniform estimate in which the implied constant depends only on n and the degree of F. As an application, we prove a specialization theorem for equidimensional dominant rational maps to semiabelian varieties, providing a complement to Habegger's recent theorem on unlikely intersections.