Add to ORKGWe give an explicit proof of the fundamental theorem of Grothendieck Galois theory: the category of separable algebras over a field K is anti-equivalent to the category of continuous actions on finite sets of the profinite fundamental group of K
These notes describe the formalism of Galois categories and fundamental groups, as introduced by A. ...
AbstractThe principal result of this paper is that there is a bijective (functorial) correspondence ...
The following text discusses the Galois Theory in a non-classical way. It consists of two chapters. ...
We give an explicit proof of the fundamental theorem of Grothendieck Galois theory: the category of ...
We give an explicit proof of the fundamental theorem of Grothendieck Galois theory: the category of ...
We give an explicit proof of the fundamental theorem of Grothendieck Galois theory: the category of ...
Grothendieck’s theory of the algebraic fundamental group is a com-mon generalization of Galois theor...
The Separable Galois Theory of Commutative Rings, Second Edition provides a complete and self-contai...
AbstractIn this note-following the line of thought introduced into Galois theory by Emil Artin in (o...
Dress A. One More Shortcut to Galois Theory. Advances in Mathematics. 1995;110(1):129-140.In this no...
Abstract. Galois theory translates questions about fields into questions about groups. The fundament...
This book presents a comprehensive introduction to the theory of separable algebras over commutative...
AbstractIn this note-following the line of thought introduced into Galois theory by Emil Artin in (o...
The classical Galois theory of fields and the classification of covering spaces of a path-connected,...
Characterizations for a Galois extension of a separable algebra are given, and applications are deri...
These notes describe the formalism of Galois categories and fundamental groups, as introduced by A. ...
AbstractThe principal result of this paper is that there is a bijective (functorial) correspondence ...
The following text discusses the Galois Theory in a non-classical way. It consists of two chapters. ...
We give an explicit proof of the fundamental theorem of Grothendieck Galois theory: the category of ...
We give an explicit proof of the fundamental theorem of Grothendieck Galois theory: the category of ...
We give an explicit proof of the fundamental theorem of Grothendieck Galois theory: the category of ...
Grothendieck’s theory of the algebraic fundamental group is a com-mon generalization of Galois theor...
The Separable Galois Theory of Commutative Rings, Second Edition provides a complete and self-contai...
AbstractIn this note-following the line of thought introduced into Galois theory by Emil Artin in (o...
Dress A. One More Shortcut to Galois Theory. Advances in Mathematics. 1995;110(1):129-140.In this no...
Abstract. Galois theory translates questions about fields into questions about groups. The fundament...
This book presents a comprehensive introduction to the theory of separable algebras over commutative...
AbstractIn this note-following the line of thought introduced into Galois theory by Emil Artin in (o...
The classical Galois theory of fields and the classification of covering spaces of a path-connected,...
Characterizations for a Galois extension of a separable algebra are given, and applications are deri...
These notes describe the formalism of Galois categories and fundamental groups, as introduced by A. ...
AbstractThe principal result of this paper is that there is a bijective (functorial) correspondence ...
The following text discusses the Galois Theory in a non-classical way. It consists of two chapters. ...