Operator algebras over the p-adic integers -- II

Abstract

We continue the study of operator algebras over the p-adic integers, initiated in our previous work [1]. In this sequel, we develop further structural results and provide new families of examples. We introduce the notion of p-adic von Neumann algebras, and analyze those with trivial center, that we call ''factors''. In particular we show that ICC groups provide examples of factors. We then establish a characterization of p-simplicity for groupoid operator algebras, showing its relation to effectiveness and minimality. A central part of the paper is devoted to a p-adic analogue of the GNS construction, leading to a representation theorem for Banach *-algebras over Zp. As applications, we exhibit large classes of p-adic operator algebras, including residually finite-rank algebras and affinoid algebras with the spectral norm. Finally, we investigate the K-theory of p-adic operator algebras, including the computation of homotopy analytic K-theory of continuous Zp-valued functions on a compact Hausdorff space and the analytic (non-homotopy invariant) K-theory of certain p-adically complete Banach algebras in terms of continuous K-theory. Together, these results extend the foundations of the emerging theory of p-adic operator algebras.