Irreducible Representations of Bost-Connes systems

Abstract

The classification problem of Bost-Connes systems was studied by Cornellissen and Marcolli partially, but still remains unsolved. In this paper, we will give a representation-theoretic approach to this problem. We generalize the result of Laca and Raeburn, which concerns with the primitive ideal space on the Bost-Connes system for Q. As a consequence, the Bost-Connes C*-algebra for a number field K has hK1-dimensional irreducible representations and does not have finite-dimensional irreducible representations for the other dimensions, where hK1 is the narrow class number of K. In particular, the narrow class number is an invariant of Bost-Connes C*-algebras.