AbstractWe define a Grothendieck topology on the category of schemes whose associated sheaf theory coincides in many cases with that of the Zariski topology. We also give some indications of possible advantages this new topology has over the Zariski topology
ABSTRACT. The context of enriched sheaf theory introduced in the author’s thesis provides a convenie...
In this survey, we expound sheaf representations of categories in the context of categorical logic. ...
The problem of this paper is to define a category of topological spaces and sheaves in topological a...
Any scheme has its associated little and big Zariski toposes. These toposes support an internal math...
These notes describe the formalism of Galois categories and fundamental groups, as introduced by A. ...
Any scheme has its associated little and big Zariski toposes. These toposes support an internal math...
Any scheme has its associated little and big Zariski toposes. These toposes support an internal math...
AbstractWe define schematic algebras to be algebras which have “enough” Ore-sets. Many graded algebr...
The first part written by Joseph Lipman, accessible to mid-level graduate students, is a full exposi...
The first part written by Joseph Lipman, accessible to mid-level graduate students, is a full exposi...
This article presents a way to associate a Grothendieck site structure to a category endowed with a ...
This article presents a way to associate a Grothendieck site structure to a category endowed with a ...
The Godement cosimplicial resolution is available for a wide range of categories of sheaves. In this...
The aims of the present thesis are to give a concrete description, in the modern language of arithme...
AbstractWe choose formal topology to deal in a basic manner with the Zariski spectra of commutative ...
ABSTRACT. The context of enriched sheaf theory introduced in the author’s thesis provides a convenie...
In this survey, we expound sheaf representations of categories in the context of categorical logic. ...
The problem of this paper is to define a category of topological spaces and sheaves in topological a...
Any scheme has its associated little and big Zariski toposes. These toposes support an internal math...
These notes describe the formalism of Galois categories and fundamental groups, as introduced by A. ...
Any scheme has its associated little and big Zariski toposes. These toposes support an internal math...
Any scheme has its associated little and big Zariski toposes. These toposes support an internal math...
AbstractWe define schematic algebras to be algebras which have “enough” Ore-sets. Many graded algebr...
The first part written by Joseph Lipman, accessible to mid-level graduate students, is a full exposi...
The first part written by Joseph Lipman, accessible to mid-level graduate students, is a full exposi...
This article presents a way to associate a Grothendieck site structure to a category endowed with a ...
This article presents a way to associate a Grothendieck site structure to a category endowed with a ...
The Godement cosimplicial resolution is available for a wide range of categories of sheaves. In this...
The aims of the present thesis are to give a concrete description, in the modern language of arithme...
AbstractWe choose formal topology to deal in a basic manner with the Zariski spectra of commutative ...
ABSTRACT. The context of enriched sheaf theory introduced in the author’s thesis provides a convenie...
In this survey, we expound sheaf representations of categories in the context of categorical logic. ...
The problem of this paper is to define a category of topological spaces and sheaves in topological a...
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