Rationality and arithmetic of the moduli of abelian varieties
Abstract
We study the rationality properties of the moduli space Ag of principally polarised abelian g-folds over Q and apply the results to arithmetic questions. In particular we show that any principally polarised abelian threefold over Fp may be lifted to an abelian variety over Q. This is a phenomenon of low dimension: assuming the Bombieri-Lang conjecture we also show that this is not the case for abelian varieties of dimension at least seven. About moduli spaces, we show that Ag is unirational over Q for g ≤ 5 and stably rational for g=3. This also allows us to make unconditional one of the results of Masser and Zannier about the existence of abelian varieties over Q that are not isogenous to Jacobians.
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