On the sheaf cohomology of some p-adic period domains with coefficients in certain line bundles

Abstract

Let p be a prime. This papers aims at investigating sheaf cohomology of a broader class of p-adic period domains, other then the Drinfeld's upper half space (cf. O2). Concretely, we let G be a split connected reductive group over Qp and restrict our attention to the p-adic period domain Fwa which parametrizes the weakly admissible filtrations on the trivial G-isocrystal inside a complete flag variety F. Then, we consider sheaf cohomology of Fwa with coefficients in vector bundles which are induced by restriction of a homogeneous line bundle on F associated to a dominant weight of G.