Add to ORKGLazda In this paper, we define a rigid rational homotopy type associated to any variety X over a perfect field k of positive characteristic. We prove comparison theorems with previous definitions in the smooth and proper, and log-smooth and proper case. Using these, we can show that if k is a finite field, then the Frobenius structure on the higher rational homotopy groups is mixed. We also define a relative rigid rational homotopy type, and use it to define a homotopy obstruction for the existence of section
We establish a tilting equivalence for rational, homotopy-invariant cohomology theories defined over...
The celebrated proof of the Hartshorne conjecture by Shigefumi Mori allowed for the study of the geo...
The celebrated proof of the Hartshorne conjecture by Shigefumi Mori allowed for the study of the geo...
In this paper we define a rigid rational homotopy type, associated to any variety $X$ over a perfect...
In this thesis I study various incarnations of rational homotopy theory in the world of arithmetic g...
Abstract. The Hyodo-Kato theorem relates the De Rham cohomology of a vari-ety over a local field wit...
The Hyodo-Kato theorem relates the De Rham cohomology of a variety over a local field with semi-stab...
The Sullivan approach to rational homotopy theory can be thought of as being applied to connected ni...
Séminaire Bourbaki, mars 2003In this talk, I report on three theorems concerning algebraic varieties...
Séminaire Bourbaki, mars 2003In this talk, I report on three theorems concerning algebraic varieties...
We study pairs of non-constant maps between two integral schemes of finite type over two (possibly d...
We define and study the fundamental pro-finite 2-groupoid of varieties X defined over a field k. Thi...
International audienceIn this paper we propose to use a relative variant of the notion of the \'{e}t...
International audienceWe establish a tilting equivalence for rational, homotopy-invariant cohomology...
International audienceIn this paper we propose to use a relative variant of the notion of the \'{e}t...
We establish a tilting equivalence for rational, homotopy-invariant cohomology theories defined over...
The celebrated proof of the Hartshorne conjecture by Shigefumi Mori allowed for the study of the geo...
The celebrated proof of the Hartshorne conjecture by Shigefumi Mori allowed for the study of the geo...
In this paper we define a rigid rational homotopy type, associated to any variety $X$ over a perfect...
In this thesis I study various incarnations of rational homotopy theory in the world of arithmetic g...
Abstract. The Hyodo-Kato theorem relates the De Rham cohomology of a vari-ety over a local field wit...
The Hyodo-Kato theorem relates the De Rham cohomology of a variety over a local field with semi-stab...
The Sullivan approach to rational homotopy theory can be thought of as being applied to connected ni...
Séminaire Bourbaki, mars 2003In this talk, I report on three theorems concerning algebraic varieties...
Séminaire Bourbaki, mars 2003In this talk, I report on three theorems concerning algebraic varieties...
We study pairs of non-constant maps between two integral schemes of finite type over two (possibly d...
We define and study the fundamental pro-finite 2-groupoid of varieties X defined over a field k. Thi...
International audienceIn this paper we propose to use a relative variant of the notion of the \'{e}t...
International audienceWe establish a tilting equivalence for rational, homotopy-invariant cohomology...
International audienceIn this paper we propose to use a relative variant of the notion of the \'{e}t...
We establish a tilting equivalence for rational, homotopy-invariant cohomology theories defined over...
The celebrated proof of the Hartshorne conjecture by Shigefumi Mori allowed for the study of the geo...
The celebrated proof of the Hartshorne conjecture by Shigefumi Mori allowed for the study of the geo...
