Local Andr\'e-Oort conjecture for the universal abelian variety
Abstract
We prove a p-adic analogue of the Andr\'e-Oort conjecture for subvarieties of the universal abelian varieties containing a dense set of special points. Let g and n be integers with n ≥ 3 and p a prime number not dividing n. Let R be a finite extension of W[ Fp alg], the ring of Witt vectors of the algebraic closure of the field of p elements. The moduli space = g,1,n of g-dimensional principally polarized abelian varieties with full level n-structure as well as the universal abelian variety π: over may be defined over R. We call a point ∈ (R) R-special if π() is a canonical lift and is a torsion point of its fibre. We show that an irreducible subvariety of R containing a dense set of p-special points must be a special subvariety in the sense of mixed Shimura varieties. Our proof employs the model theory of difference fields.
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