Add to ORKGAbstract The zeta function of a number field can be interpreted as the partition function of an associated quantum statistical mechanical (QSM) system, built from abelian class field theory. We introduce a general notion of isomorphism of QSM-systems and prove that it preserves (extremal) KMS equilibrium states. We prove that two number fields with isomorphic quantum statistical mechanical systems are arithmetically equivalent, i.e., have the same zeta function. If one of the fields is normal over Q, this implies that the fields are isomorphic. Thus, in this case, isomorphism of QSM-systems is the same as isomorphism of number fields, and the noncommutative space built from the abelianized Galois group can replace the anabelian absolute Gal...
Abstract. In this article we develop a broad generalization of the classical Bost-Connes system, whe...
The Dirichlet series of the multiplicative theory of numbers can be reinterpreted as partition funct...
The Dirichlet series of the multiplicative theory of numbers can be reinterpreted as partition funct...
The zeta function of a number field can be interpreted as the partition function of an associated qu...
The zeta function of a number field can be interpreted as the partition function of an associated qu...
Abstract. To every number field is associated a dynamical system, given by an action of the free abe...
We construct a quantum statistical mechanical system which generalizes the Bost–Connes system to ima...
We construct a quantum statistical mechanical system which generalizes the Bost–Connes system to ima...
We review our recent results on the noncommutative geometry of Q-lattices modulo commensurability. W...
We review our recent results on the noncommutative geometry of Q-lattices modulo commensurability. W...
Several results point to deep relations between noncommutative geometry and class field theory ([3],...
In this article we develop a broad generalization of the classical Bost-Connes system, where roots o...
We present possible extensions of the quantum statistical mechanical formulation of class field theo...
We present possible extensions of the quantum statistical mechanical formulation of class field theo...
We present possible extensions of the quantum statistical mechanical formulation of class field theo...
Abstract. In this article we develop a broad generalization of the classical Bost-Connes system, whe...
The Dirichlet series of the multiplicative theory of numbers can be reinterpreted as partition funct...
The Dirichlet series of the multiplicative theory of numbers can be reinterpreted as partition funct...
The zeta function of a number field can be interpreted as the partition function of an associated qu...
The zeta function of a number field can be interpreted as the partition function of an associated qu...
Abstract. To every number field is associated a dynamical system, given by an action of the free abe...
We construct a quantum statistical mechanical system which generalizes the Bost–Connes system to ima...
We construct a quantum statistical mechanical system which generalizes the Bost–Connes system to ima...
We review our recent results on the noncommutative geometry of Q-lattices modulo commensurability. W...
We review our recent results on the noncommutative geometry of Q-lattices modulo commensurability. W...
Several results point to deep relations between noncommutative geometry and class field theory ([3],...
In this article we develop a broad generalization of the classical Bost-Connes system, where roots o...
We present possible extensions of the quantum statistical mechanical formulation of class field theo...
We present possible extensions of the quantum statistical mechanical formulation of class field theo...
We present possible extensions of the quantum statistical mechanical formulation of class field theo...
Abstract. In this article we develop a broad generalization of the classical Bost-Connes system, whe...
The Dirichlet series of the multiplicative theory of numbers can be reinterpreted as partition funct...
The Dirichlet series of the multiplicative theory of numbers can be reinterpreted as partition funct...