This is a survey about connections between central simple algebras and Galois representations in the case of number fields.This is a survey about connections between central simple algebras and Galois representations in the case of number fields
Abstract. We state conjectures on the relationships between automorphic representations and Galois r...
Galois Theory, a wonderful part of mathematics with historical roots date back to the solution of cu...
We define a Galois structure between central extensions and extensions in a Maltsev variety. By usin...
We investigate class two representations of the absolute Galois group of a number field by using cen...
The first modern, comprehensive introduction to central simple algebras for graduate students and re...
This is a survey article on algebraic number theory and its purpose is to show the great importance ...
The purpose of this paper is to reconsider and improve upon relations between central characters and...
AbstractWe propose a theory of central extensions for universal algebras, and more generally for obj...
Galois Theory plays a key role in many mathematical disciplines, such as number theory, algebra, top...
An algebraic number field is a finite extension of Q; an algebraic number is an element of an algebr...
Abstract. Galois theory translates questions about fields into questions about groups. The fundament...
AbstractWe consider linear representations of the Galois groups of number fields in two different ch...
The focus of this thesis is to use Galois Theory to prove results in Number Theory. As a result, we ...
Central simple algebras arise naturally in many areas of mathematics. They are closely connected wit...
This book presents the main ideas of General Galois Theory as a generalization of Classical Galois T...
Abstract. We state conjectures on the relationships between automorphic representations and Galois r...
Galois Theory, a wonderful part of mathematics with historical roots date back to the solution of cu...
We define a Galois structure between central extensions and extensions in a Maltsev variety. By usin...
We investigate class two representations of the absolute Galois group of a number field by using cen...
The first modern, comprehensive introduction to central simple algebras for graduate students and re...
This is a survey article on algebraic number theory and its purpose is to show the great importance ...
The purpose of this paper is to reconsider and improve upon relations between central characters and...
AbstractWe propose a theory of central extensions for universal algebras, and more generally for obj...
Galois Theory plays a key role in many mathematical disciplines, such as number theory, algebra, top...
An algebraic number field is a finite extension of Q; an algebraic number is an element of an algebr...
Abstract. Galois theory translates questions about fields into questions about groups. The fundament...
AbstractWe consider linear representations of the Galois groups of number fields in two different ch...
The focus of this thesis is to use Galois Theory to prove results in Number Theory. As a result, we ...
Central simple algebras arise naturally in many areas of mathematics. They are closely connected wit...
This book presents the main ideas of General Galois Theory as a generalization of Classical Galois T...
Abstract. We state conjectures on the relationships between automorphic representations and Galois r...
Galois Theory, a wonderful part of mathematics with historical roots date back to the solution of cu...
We define a Galois structure between central extensions and extensions in a Maltsev variety. By usin...
DOI
Add to ORKG