Semistable abelian varieties and maximal torsion 1-crystalline submodules

Abstract

Let p be a prime, let K be a discretely valued extension of Qp, and let AK be an abelian K-variety with semistable reduction. Extending work by Kim and Marshall from the case where p>2 and K/Qp is unramified, we prove an l=p complement of a Galois cohomological formula of Grothendieck for the l-primary part of the N\'eron component group of AK. Our proof involves constructing, for each m∈ Z≥ 0, a finite flat OK-group scheme with generic fiber equal to the maximal 1-crystalline submodule of AK[pm]. As a corollary, we have a new proof of the Coleman-Iovita monodromy criterion for good reduction of abelian K-varieties.