Vojta's conjecture, heights associated with subschemes, and primitive prime divisors in arithmetic dynamics

Abstract

Assuming Vojta's conjecture, we give a sufficient condition for the limit \[ n ∞ hY(fn(x))hH(fn(x)) \] is equal to zero, where f X X is a surjective self-morphism on a smooth projective variety X, hH is an ample height function on X, and hY is a global height function associated with a closed subscheme Y ⊂ X of codimension at least two. Based on this, we propose a conjecture on a sufficient condition for the limit to be zero. We point out that our conjecture implies Dynamical Mordell-Lang conjecture for endomorphisms on P2Q. We also discuss applications of Vojta's conjecture with truncated counting function to the problem of the existence of primitive prime divisors of coordinates of orbits of f