Finiteness of function field-valued points on exceptional Shimura varieties
Abstract
Let C/k be a smooth curve over a finite field of characteristic p>0. We prove that there are finitely many principally polarized abelian schemes of given dimension g over C up to p-power isogeny. For curves over k, we prove that the moduli space of such abelian schemes is finite type up to p-power isogeny. Moreover, we generalize this result to arbitrary (not necessarily abelian type) Shimura varieties S and sufficiently large primes p in terms of S: The space of generically ordinary morphisms C Sk (resp. C Sk) is finite (resp. finite type) up to p-Hecke orbits.
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