Oort's conjecture on automorphisms of generic supersingular abelian varieties
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We prove Oort's conjecture that generically on the supersingular locus of the moduli space of principally polarized abelian varieties of genus g and in characteristic p, the automorphism group of the universal principally polarized abelian variety consists only of $\pm 1$, unless g=2 or 3 and p=2. On the way, we provide an explicit description of the a=1-locus in the Rapoport-Zink space of principally polarized supersingular p-divisible groups of any dimension g. We also prove analogous results for generic automorphism groups on moduli spaces of supersingular p-divisible groups with and without polarization.
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Automorphism groups of hyperelliptic curves of $2$-rank zero
Reduced automorphism groups of small-genus 2-rank-zero hyperelliptic curves in char 2 are computed via Magma, yielding two conjectures analogous to the Oort conjecture.
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