Add to ORKGWe introduce a new category of non-archimedean analytic spaces over a complete discretely valued field. These spaces, which we call uniformly rigid, may be viewed as classical rigid-analytic spaces together with an additional uniform structure: On the level of points, a uniformly rigid space coincides with its underlying rigid space, while its G-topology is coarser and its sheaf of holomorphic functions is smaller. A uniformly rigid structure is, locally, induced by an integral formal model of formally finite type. In fact, Berthelot's generic fiber functor factors naturally through the category of uniformly rigid spaces. The uniformly rigid generic fiber of a quasi-compact formal scheme of formally finite type is quasi-compact, and its glo...
Abstract. Rigidity questions on rational homogeneous spaces arise naturally as higher dimen-sional g...
We study the general fibre of a formal deformation over the formal disk of a projective variety from...
AbstractLet T denote the forgetful functor from the category Quu of quasi-uniform spaces and quasi-u...
Im ersten Teil der vorliegenden Dissertation definiere und untersuche ich die Kategorie der uniform ...
Uniformly finite homology was introduced by Block and Weinberger to study large-scale structures of ...
Uniformly finite homology is a coarse homology theory, defined via chains that satisfy a uniform bou...
It is known that in algebraic geometry the N\ue9ron model (if it exists) of a smooth group scheme G ...
In this talk I will explain how the use of functors defined on the category \(I\) of finite sets and...
In this paper we define a rigid rational homotopy type, associated to any variety $X$ over a perfect...
We set up the geometric background necessary to extend rigid cohomology from the case of algebraic v...
Abstract. Several large classes of homogeneous spaces are known to be formal—in the sense of Rationa...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
Abstract. This paper is a summary of the author’s doctoral dissertation. We study homotopy theory in...
We study pairs of non-constant maps between two integral schemes of finite type over two (possibly d...
AbstractThe collection of points of a locally compact regular formal space is shown to be isomorphic...
Abstract. Rigidity questions on rational homogeneous spaces arise naturally as higher dimen-sional g...
We study the general fibre of a formal deformation over the formal disk of a projective variety from...
AbstractLet T denote the forgetful functor from the category Quu of quasi-uniform spaces and quasi-u...
Im ersten Teil der vorliegenden Dissertation definiere und untersuche ich die Kategorie der uniform ...
Uniformly finite homology was introduced by Block and Weinberger to study large-scale structures of ...
Uniformly finite homology is a coarse homology theory, defined via chains that satisfy a uniform bou...
It is known that in algebraic geometry the N\ue9ron model (if it exists) of a smooth group scheme G ...
In this talk I will explain how the use of functors defined on the category \(I\) of finite sets and...
In this paper we define a rigid rational homotopy type, associated to any variety $X$ over a perfect...
We set up the geometric background necessary to extend rigid cohomology from the case of algebraic v...
Abstract. Several large classes of homogeneous spaces are known to be formal—in the sense of Rationa...
An abelian variety Z over a complete valued field k, which has a bad reduction, can be uniformized i...
Abstract. This paper is a summary of the author’s doctoral dissertation. We study homotopy theory in...
We study pairs of non-constant maps between two integral schemes of finite type over two (possibly d...
AbstractThe collection of points of a locally compact regular formal space is shown to be isomorphic...
Abstract. Rigidity questions on rational homogeneous spaces arise naturally as higher dimen-sional g...
We study the general fibre of a formal deformation over the formal disk of a projective variety from...
AbstractLet T denote the forgetful functor from the category Quu of quasi-uniform spaces and quasi-u...