Transcendence of the Hodge-Tate filtration

Abstract

For C a complete algebraically closed extension of Qp, we show that a one-dimensional p-divisible group G/ OC can be defined over a complete discretely valued subfield L ⊂ C with Hodge-Tate period ratios contained in L if and only if G has CM, if and only if the period ratios generate an extension of Qp of degree equal to the height of the connected part of G. This is a p-adic analog of a classical transcendence result of Schneider which states that for τ in the complex upper half plane, τ and j(τ) are simultaneously algebraic over Q if and only if τ is contained in a quadratic extension of Q. We also briefly discuss a conjectural generalization to shtukas with one paw.