Phase transition on the Toeplitz algebra of the affine semigroup over the natural numbers

Abstract

We show that the group Q Q*+ of orientation-preserving affine transformations of the rational numbers is quasi-lattice ordered by its subsemigroup N N×. The associated Toeplitz C*-algebra T( N N×) is universal for isometric representations which are covariant in the sense of Nica. We give a presentation of this Toeplitz algebra in terms of generators and relations, and use this to show that the C*-algebra Q N recently introduced by Cuntz is the boundary quotient of ( Q Q*+, N N×) in the sense of Crisp and Laca. The Toeplitz algebra T( N N×) carries a natural dynamics σ, which induces the one considered by Cuntz on the quotient Q N, and our main result is the computation of the KMSβ (equilibrium) states of the dynamical system ( T( N N×), R,σ) for all values of the inverse temperature β. For β ∈ [1, 2] there is a unique KMSβ state, and the KMS1 state factors through the quotient map onto Q N, giving the unique KMS state discovered by Cuntz. At β =2 there is a phase transition, and for β>2 the KMSβ states are indexed by probability measures on the circle. There is a further phase transition at β=∞, where the KMS∞ states are indexed by the probability measures on the circle, but the ground states are indexed by the states on the classical Toeplitz algebra T( N).