p-adic hyperbolicity for moduli spaces of abelian motives
Abstract
We prove that Shimura varieties of abelian type satisfy a p-adic Borel-extension property over discretely valued fields. More precisely, let D denote the rigid-analytic closed unit disc and D× = D \0\, let X be a smooth rigid-analytic variety, and let S(G,H)K denote a Shimura variety of abelian type with torsion-free level structure. We prove every rigid-analytic map defined over a discretely valued p-adic field D× × X → S(G,H)Kan extends to an analytic map D × X → (S(G,H)KBB)an, where S(G,H)KBB is the Baily-Borel compactification of S(G,H)K. We also deduce various applications to algebraicity of analytic maps, degenerations of families of abeloids, and to p-adic notions of hyperbolicity. Along the way, we also prove an extension result for Rapoport-Zink spaces.
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