Given a family of Galois coverings of the projective line, we give a simple sufficient condition ensuring that the closure of the image of the family via the period mapping is a special (or Shimura) subvariety of A g . By a computer program we get the list of all families in genus g ≤ 9 satisfying our condition. There are no families with g = 8, 9; all of them are in genus g ≤ 7. These examples are related to a conjecture of Oort. Among them we get the cyclic examples constructed by various authors (Shimura, Mostow, De Jong-Noot, Rohde, Moonen, and others) and the abelian noncyclic examples found by Moonen–Oort. We get seven new nonabelian examples.

Shimura varieties in the Torelli locus via Galois coverings

FREDIANI, PAOLA;GHIGI, ALESSANDRO CALLISTO;
2015-01-01

Abstract

Given a family of Galois coverings of the projective line, we give a simple sufficient condition ensuring that the closure of the image of the family via the period mapping is a special (or Shimura) subvariety of A g . By a computer program we get the list of all families in genus g ≤ 9 satisfying our condition. There are no families with g = 8, 9; all of them are in genus g ≤ 7. These examples are related to a conjecture of Oort. Among them we get the cyclic examples constructed by various authors (Shimura, Mostow, De Jong-Noot, Rohde, Moonen, and others) and the abelian noncyclic examples found by Moonen–Oort. We get seven new nonabelian examples.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11571/979654
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