Bost-Connes type systems for function fields
Abstract
We describe a construction which associates to any function field k and any place ∞ of k a C*-dynamical system (Ck,∞,σt) that is analogous to the Bost-Connes system associated to and its archimedian place. Our construction relies on Hayes' explicit class field theory in terms of sign-normalized rank one Drinfel'd modules. We show that Ck,∞ has a faithful continuous action of (K/k), where K is a certain field constructed by Hayes, such that k⊂ K⊂ k, where k is the maximal abelian extension of k that is totally split at ∞. We classify the extremal KMSβ states of (Ck,∞,σt) at any temperature 0<1/β<∞ and show that a phase transition with spontaneous symmetry breaking occurs at temperature 1/β=1. At high temperature 1/β≥slant 1, there is a unique KMSβ state. At low temperature 1/β<1, the space of extremal KMSβ states is principal homogeneous under (K/k). Each such state is of type ∞ and the partition function is the Dedekind zeta function ζk,∞. Moreover, we construct a "rational" *-subalgebra , we give a presentation of and of Ck,∞, and we show that the values of the low-temperature extremal KMSβ states at certain elements of are related to special values of partial zeta functions. Erratum: This article wrongly claims that at high temperature 1/β≥slant 1, the unique KMSβ state is of type q-β, where q is the cardinal of the constant subfield of k. It has been shown by Neshveyev and Rustad NesRus12 that the correct type is q-β d∞ where d∞ is the degree of the place ∞. The original statements have been kept for reference, but errata have been inserted next to them.
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