Add to ORKGWe describe a simpli ed categorical approach to Galois descent theory. It is well known that Galois descent is a special case of Grothendieck descent, and that under mild additional conditions the category of Grothendieck descent data coincides with the Eilenberg-Moore category of algebras over a suitable monad. This also suggests using monads directly, and our monadic approach to Galois descent makes no reference to Grothendieck descent theory at all. In order to make Galois descent constructions perfectly clear, we also describe their connections with some other related constructions of categorical algebra, and make various explicit calculations, especially with 1-cocycles and 1-dimensional non-abelian cohomology, usually omitted ...
AbstractIn 1993, Kelly and Power showed that the category of finitary monads on a locally finitely p...
We show that the adjunction between monoids and groups obtained via the Grothendieck group construct...
These notes describe the formalism of Galois categories and fundamental groups, as introduced by A. ...
We describe a simplified categorical approach to Galois descent theory. It is well known that Galois...
One of the essential points concerning Grothendieck's original approach to descent theory consists ...
One of the essential points concerning Grothendieck's original approach to descent theory consists ...
There is a construction which lies at the heart of descent theory. The combinatorial aspects of this...
We provide an overview of the construction of categorical semidirect products and discuss their form...
The fundamental construction underlying descent theory, the lax descent category, comes with a funct...
Abstract. We show, for an arbitrary adjunction F ⊣ U: B → A with B Cauchy complete, that the functor...
Abstract. We introduce Galois corings, and give a survey of proper-ties that have been obtained so f...
Abstract. Motivated by a desire to gain a better understanding of the “dimensionby-dimension” decomp...
Abstract. Motivated by a desire to gain a better understanding of the “dimensionby-dimension” decomp...
introduced comatrix corings, generalizing Sweedler’s canonical coring, and proved a new version of t...
In this paper we use Janelidze’s approach to the classical theory of topological coverings via categ...
AbstractIn 1993, Kelly and Power showed that the category of finitary monads on a locally finitely p...
We show that the adjunction between monoids and groups obtained via the Grothendieck group construct...
These notes describe the formalism of Galois categories and fundamental groups, as introduced by A. ...
We describe a simplified categorical approach to Galois descent theory. It is well known that Galois...
One of the essential points concerning Grothendieck's original approach to descent theory consists ...
One of the essential points concerning Grothendieck's original approach to descent theory consists ...
There is a construction which lies at the heart of descent theory. The combinatorial aspects of this...
We provide an overview of the construction of categorical semidirect products and discuss their form...
The fundamental construction underlying descent theory, the lax descent category, comes with a funct...
Abstract. We show, for an arbitrary adjunction F ⊣ U: B → A with B Cauchy complete, that the functor...
Abstract. We introduce Galois corings, and give a survey of proper-ties that have been obtained so f...
Abstract. Motivated by a desire to gain a better understanding of the “dimensionby-dimension” decomp...
Abstract. Motivated by a desire to gain a better understanding of the “dimensionby-dimension” decomp...
introduced comatrix corings, generalizing Sweedler’s canonical coring, and proved a new version of t...
In this paper we use Janelidze’s approach to the classical theory of topological coverings via categ...
AbstractIn 1993, Kelly and Power showed that the category of finitary monads on a locally finitely p...
We show that the adjunction between monoids and groups obtained via the Grothendieck group construct...
These notes describe the formalism of Galois categories and fundamental groups, as introduced by A. ...