Level structures on abelian varieties and Vojta's conjecture

Abstract

Assuming Vojta's conjecture, and building on recent work of the authors, we prove that, for a fixed number field K and positive integer g, there is an integer m0 such that for any m > m0 there is no principally polarized abelian variety A/K of dimension g with full level-m structure. To this end, we develop a version of Vojta's conjecture for Deligne-Mumford stacks, which we deduce from Vojta's conjecture for schemes.