Isotriviality of families of curves parametrized by Ag(n)
Abstract
We prove that for every integers g, h≥ 2, n ≥ 3, for all but finitely many prime numbers p, for every field k of characteristic 0 or p, every separable family of smooth projective curves of genus h over Ag(n) k is isotrivial. To prove this, we compute the common vanishing locus of the absolutely logarithmic symmetric forms on a smooth complex algebraic variety whose universal covering is biholomorphic to an irreducible bounded symmetric domain of rank at least 2.
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