Growth of local height functions along orbits of self-morphisms on projective varieties

Abstract

In this paper, we consider the limit n ∞ Σv∈ S λY,v(fn(x))/hH(fn(x)) where f X X is a surjective self-morphism on a smooth projective variety X over a number field, S is a finite set of places, λY,v is a local height function associated with a proper closed subscheme Y ⊂ X, and hH is an ample height function on X. We give a geometric condition which ensures that the limit is zero, unconditionally when Y=0 and assuming Vojta's conjecture when Y≥1. In particular, we prove (one is unconditional, one is assuming Vojta's conjecture) Dynamical Lang-Siegel type theorems, that is, the relative sizes of coordinates of orbits on PN are asymptotically the same with trivial exceptions. These results are higher dimensional generalization of Silverman's classical result.