Add to ORKGWe study a dynamical system induced by the Artin reciprocity map for a global field. We translate the conjugacy of such dynamical systems into various arithmetical properties that are equivalent to field isomorphism, relating it to anabelian geometry
We find invariants of number fields and of Galois representations of number fields that characterise...
We consider the following general problem: let F be a known field with absolute Galois group GF. Let...
Global class field theory is a major achievement of algebraic number theory, based on the functorial...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
Artin L-functions associated to continuous representations of the absolute Galois group G_K of a glo...
Abstract. To every number field is associated a dynamical system, given by an action of the free abe...
This master’s thesis, Global field isomorphisms: a class field theoretical approach, was written by ...
Let $K$ be a number field, $f\in K[x]$ and $\alpha\in K$. A recent conjecture of Andrews and Petsche...
We find invariants of number fields and of Galois representations of number fields that characterise...
We find invariants of number fields and of Galois representations of number fields that characterise...
We consider the following general problem: let F be a known field with absolute Galois group GF. Let...
Global class field theory is a major achievement of algebraic number theory, based on the functorial...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
We study a dynamical system induced by the Artin reciprocity map for a global field. We translate th...
Artin L-functions associated to continuous representations of the absolute Galois group G_K of a glo...
Abstract. To every number field is associated a dynamical system, given by an action of the free abe...
This master’s thesis, Global field isomorphisms: a class field theoretical approach, was written by ...
Let $K$ be a number field, $f\in K[x]$ and $\alpha\in K$. A recent conjecture of Andrews and Petsche...
We find invariants of number fields and of Galois representations of number fields that characterise...
We find invariants of number fields and of Galois representations of number fields that characterise...
We consider the following general problem: let F be a known field with absolute Galois group GF. Let...
Global class field theory is a major achievement of algebraic number theory, based on the functorial...
