A p-adic local invariant cycle theorem with applications to Brauer groups

Abstract

In this article, we prove a p-adic analogue of the local invariant cycle theorem for H2 in mixed characteristics. As a result, for a smooth projective variety X over a p-adic local field K with a proper flat regular model X over OK, we show that the natural map Br(X)→ Br(XK)GK has a finite kernel and a finite cokernel. And we prove that the natural map Hom(Br(X)/Br(K)+Br(X), Q/Z) → AlbX(K) has a finite kernel and a finite cokernel, generalizing Lichtenbaum's duality between Brauer groups and Jacobians for curves to arbitrary dimensions.