Maximality and symmetry related to the \(2\)-adic ring \(C*\)-algebra

Abstract

The 2-adic ring C*-algebra Q2 is the universal C*-algebra generated by a unitary and an isometry satisfying certain relations. It contains a canonical copy of the Cuntz algebra O2. We show that O2 is a maximal C*-subalgebra of Q2. Furthermore, we examine the structure of the fixed-point algebra under a periodic \(*\)-automorphism σ of Q2, which is extended from the flip-flop \(*\)-automorphism of O2. We show that the maximality of O2 in Q2 extends to the crossed product O2 σ Z2 in Q2 σ Z2, and to the fixed-point algebra O2σ in Q2σ. As a consequences of our main results, a few open questions concerning Q2 are resolved.