Level structures on abelian varieties, Kodaira dimensions, and Lang's conjecture

Abstract

Assuming Lang's conjecture, we prove that for a fixed prime p, number field K, and positive integer g, there is an integer r such that no principally polarized abelian variety A/K of dimension g has full level pr structure. To this end, we use a result of Zuo to prove that for each closed subvariety X in the moduli space Ag of principally polarized abelian varieties of dimension g, there exists a level mX such that the irreducible components of the preimage of X in Ag[m] are of general type for m > mX.