Characterizing perfectoid covers of abelian varieties

Abstract

We give a simple characterization of all perfectoid profinite \'etale covers of abelian varieties in terms of the Hodge-Tate filtration on the p-adic Tate module. We also compute the geometric Sen morphism for all profinite p-adic Lie torsors over an abelian variety, and combine this with our characterization to prove a conjecture of Rodr\'iguez Camargo on perfectoidness of p-adic Lie torsors in this case. We obtain complementary results for covers of semi-abeloid varieties, p-divisible rigid analytic groups, and varieties with globally generated 1-forms. Our proof of perfectoidness for covers of abelian varieties is based on results of Scholze on the canonical subgroup and holds for an arbitrary abelian variety over an algebraically closed non-archimedean extension of Qp. In an appendix authored by Tongmu He, an alternate proof is presented in the case of abelian varieties that can be defined over a discretely valued subfield by combining our computation of the geometric Sen morphism with previous pointwise perfectoidness and purity of perfectoidness results of He.