Faltings extension and Hodge-Tate filtration for abelian varieties over p-adic local fields with imperfect residue fields

Abstract

Let K be a complete discrete valuation field of characteristic 0 with not necessarily perfect residue field of characteristic p>0. We define a Faltings extension of OK over Zp, and we construct a Hodge-Tate filtration for abelian varieties over K by generalizing Fontaine's construction in 1981, where he treated the perfect residue field case.