Add to ORKGWe combine Deligne's global invariant cycle theorem, and the algebraicity theorem of Cattani, Deligne and Kaplan, for the connected components of the locus of Hodge classes, to conclude that under simple assumptions these components are defined over number fields (assuming the initial family is), as expected from the Hodge conjecture. We also show that the Hodge conjecture for (weakly) absolute Hodge classes reduces to the Hodge conjecture for (weakly) absolute Hodge classes on varieties defined over number fields
We show that for very general hypersurfaces in odd-dimensional simplicial projective toric varieties...
We show that for very general hypersurfaces in odd-dimensional simplicial projective toric varieties...
We show that the local and global invariant cycle theorems for Hodge modules follow easily from the ...
This paper addresses several questions related to the Hodge conjecture. First of all we consider the...
This thesis tackles different problems related to the connection between geometric and Hodge theoret...
We introduce the notion of dR-absolutely special subvarieties in motivic variations of Hodge structu...
These notes should be seen as a companion to [8], where thealgebraicity of the loci of Hodge classes...
AbstractThe Hodge conjecture implies decidability of the question whether a given topological cycle ...
This is the announcement of a conjecture on a Hodge locus for cubic hypersurfaces.Comment: With an a...
Let S be a nonsingular complex algebraic variety and V a polarized variation of Hodge structure of w...
Let S be a nonsingular complex algebraic variety and V a polarized variation of Hodge structure of w...
Let S be a nonsingular complex algebraic variety and V a polarized variation of Hodge structure of w...
AbstractThe Hodge conjecture implies decidability of the question whether a given topological cycle ...
We prove that the Jacquet-Langlands correspondence for cohomological automorphic forms on quaternion...
30 p., séminaire Bourbaki, 65éme année, 2012-2013, exp. 1063. Comments welcomeInternational audience...
We show that for very general hypersurfaces in odd-dimensional simplicial projective toric varieties...
We show that for very general hypersurfaces in odd-dimensional simplicial projective toric varieties...
We show that the local and global invariant cycle theorems for Hodge modules follow easily from the ...
This paper addresses several questions related to the Hodge conjecture. First of all we consider the...
This thesis tackles different problems related to the connection between geometric and Hodge theoret...
We introduce the notion of dR-absolutely special subvarieties in motivic variations of Hodge structu...
These notes should be seen as a companion to [8], where thealgebraicity of the loci of Hodge classes...
AbstractThe Hodge conjecture implies decidability of the question whether a given topological cycle ...
This is the announcement of a conjecture on a Hodge locus for cubic hypersurfaces.Comment: With an a...
Let S be a nonsingular complex algebraic variety and V a polarized variation of Hodge structure of w...
Let S be a nonsingular complex algebraic variety and V a polarized variation of Hodge structure of w...
Let S be a nonsingular complex algebraic variety and V a polarized variation of Hodge structure of w...
AbstractThe Hodge conjecture implies decidability of the question whether a given topological cycle ...
We prove that the Jacquet-Langlands correspondence for cohomological automorphic forms on quaternion...
30 p., séminaire Bourbaki, 65éme année, 2012-2013, exp. 1063. Comments welcomeInternational audience...
We show that for very general hypersurfaces in odd-dimensional simplicial projective toric varieties...
We show that for very general hypersurfaces in odd-dimensional simplicial projective toric varieties...
We show that the local and global invariant cycle theorems for Hodge modules follow easily from the ...