The cohomology of p-adic distribution representations

Abstract

We give a generalization of Kostant's theorem on Lie algebra cohomology of finite dimensional highest weight representations to some infinite dimensional cases over a p-adic family of highest weight distribution representations. For proving this, we develop a theory of eigen orthonormalizable Banach representations of p-adic torus over an affinoid algebra, and we construct an eigen orthonormalizable weight completion of the distribution representations.