Gelfand-Kirillov bound for p-adic Banach representations with infinitesimal character for GL2 and quaternion units

Abstract

We prove that an admissible p-adic Banach representation of GL2K whose locally analytic vectors have an infinitesimal character has Gelfand-Kirillov dimension ≤[K Qp], where p>2 and K is a p-adic field. We also prove this for the group of units of the quaternions over K replacing GL2K. In the process, we make some observations in the theory of p-adic Banach representations that might be of independent interest.