Bowen--Franks groups and minus class groups of cyclotomic number fields with prime conductor

Abstract

Let p be an odd rational prime and consider the cyclotomic number field K = Q(ζp) of conductor p. We construct a directed graph Y on p-1 vertices for which the torsion part of the corresponding Bowen--Franks group is closely related to the minus part of the class group of K. In particular, both groups have the same cardinality up to an explicit power of p. Furthermore, they are both Gal(K/Q)-modules, and we prove the equality of the cardinalities of their isotypic components after tensoring them with the valuation ring of an appropriate -adic field for p-1.