Dynamical Mordell-Lang and Automorphisms of Blow-ups

Abstract

We show that if φ : X X is an automorphism of a smooth projective variety and D ⊂ X is an irreducible divisor for which the set of d in D with φn(d) in D for some nonzero n is not Zariski dense, then (X, φ) admits an equivariant rational fibration to a curve. As a consequence, we show that certain blowups (e.g. blowups in high codimension) do not alter the finiteness of Aut(X), extending results of Bayraktar-Cantat. We also generalize results of Arnol'd on the growth of multiplicities of the intersection of a variety with the iterates of some other variety under an automorphism. These results follow from a non-reduced analogue of the dynamical Mordell-Lang conjecture. Namely, let φ : X X be an \'etale endomorphism of a smooth projective variety X over a field k of characteristic zero. We show that if Y and Z are two closed subschemes of X, then the set Aφ(Y,Z) = \n : φn(Y) ⊂eq Z\ is the union of a finite set and finitely many residue classes, whose modulus is bounded in terms of the geometry of Y.