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

@article{Abramovich2016LevelSO, title={Level structures on abelian varieties, Kodaira dimensions, and Lang's conjecture}, author={Dan Abramovich and Anthony V{\'a}rilly-Alvarado}, journal={arXiv: Algebraic Geometry}, year={2016} }

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 $p^r$ structure. To this end, we use a result of Zuo to prove that for each closed subvariety $X$ in the moduli space $\mathcal{A}_g$ of principally polarized abelian varieties of dimension $g$, there exists a level $m_X$ such that the irreducible components of the preimage of… Expand

#### 12 Citations

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Level structures on abelian varieties and Vojta’s conjecture

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Assuming Vojta’s conjecture, and building on recent work of the authors, we prove that, for a fixed number field $K$ and a positive integer $g$ , there is an integer $m_{0}$ such that for any… Expand

ABELIAN $n$ -DIVISION FIELDS OF ELLIPTIC CURVES AND BRAUER GROUPS OF PRODUCT KUMMER & ABELIAN SURFACES

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Let $Y$ be a principal homogeneous space of an abelian surface, or a K3 surface, over a finitely generated extension of $\mathbb{Q}$ . In 2008, Skorobogatov and Zarhin showed that the Brauer group… Expand

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