Arithmetic monodromy of hyper-K\"ahler varieties over p-adic fields

Abstract

In this paper, we study the p-adic and -adic monodromy operators associated with hyper-K\"ahler varieties over p-adic fields, in connection with Looijenga-Lunts-Verbitsky Lie algebras. We investigate a conjectural relation between the nilpotency indices of these monodromy operators on higher-degree cohomology groups and on the second cohomology, which may be viewed as an arithmetic analogue of Nagai's conjecture for degenerations of hyper-K\"ahler manifolds over a disk. We verify this arithmetic version of Nagai's conjecture for hyper-K\"ahler varieties over p-adic fields, assuming they belong to one of the four known deformation types. As part of our approach, we introduce a new method to analyze the p-adic cohomology of hyper-K\"ahler varieties via Sen's theory.