A Kulikov-Type Classification Theorem for a One Parameter Family of K3-Surfaces Over a p-ADIC Field and a Good Reduction Criterion

Abstract

In this paper, we prove a p-adic analogous of the Kulikov-Persson-Pinkham classification theorem [Persson:1981wp] for the central fiber of a degeneration of K3-surfaces in terms of the nilpotency degree of the monodromy of the family. Namely, let XK be a be a smooth, projective K3-surface which has a minimal semi-stable model X over OK. If we let Nst be the monodromy operator on Dst(H2et(X K, Qp)), then we prove that the degree of nilpotency of Nst determines the type of the special fiber of X. As a consequence we give a criterion for the good reduction of the semi-stable K3-surface XK over the p-adic field K in terms of its p-adic representation H2et(X K, Qp), which is similar to the criterion of good reduction for p-adic abelian varieties and curves given by Coleman-Iovita and Andreatta-Iovita-Kim.