AbstractWe prove that extension groups in strict polynomial functor categories compute the rational cohomology of classical algebraic groups. This result was previously known only for general linear groups. We give several applications to the study of classical algebraic groups, such as a cohomological stabilization property, the injectivity of external cup products, and the existence of Hopf algebra structures on the (stable) cohomology of a classical algebraic group with coefficients in a Hopf algebra. Our result also opens the way to new explicit cohomology computations. We give an example inspired by recent computations of Djament and Vespa
La thèse comprend une version abrégée en anglais.In this thesis, we study homological and cohomologi...
We study the homological algebra in the category $\mathcal{P}_p$ of strict polynomial functors of de...
We uncover several general phenomenas governing functor homology over additive categories. In partic...
International audienceWe prove that extension groups in strict polynomial functor categories compute...
AbstractWe prove that extension groups in strict polynomial functor categories compute the rational ...
To any almost faithful representation of a complex, connected, reductive algebraic group Gof highest...
This book features a series of lectures that explores three different fields in which functor homolo...
The work presented in this thesis deals with the study of representations ans cohomology of strict p...
Aquilino C. On strict polynomial functors: monoidal structure and Cauchy filtration. (Ergänzte Versi...
In the article [8], Janelidze introduced the concept of a double central exten- sion in order to ana...
If G is an affine algebraic group over a field F, and M is a finite-dimensional Fvector space, then ...
Let G be a semisimple simply connected linear algebraic group over an algebraically closed field k o...
Abstract. With Fq a nite eld of characteristic p, let F(q) be the category whose objects are functor...
In this thesis, we apply homological methods to the study of groups in two ways: firstly, we general...
To any almost faithful representation of a complex, connected, reductive algebraic group $G$ of high...
La thèse comprend une version abrégée en anglais.In this thesis, we study homological and cohomologi...
We study the homological algebra in the category $\mathcal{P}_p$ of strict polynomial functors of de...
We uncover several general phenomenas governing functor homology over additive categories. In partic...
International audienceWe prove that extension groups in strict polynomial functor categories compute...
AbstractWe prove that extension groups in strict polynomial functor categories compute the rational ...
To any almost faithful representation of a complex, connected, reductive algebraic group Gof highest...
This book features a series of lectures that explores three different fields in which functor homolo...
The work presented in this thesis deals with the study of representations ans cohomology of strict p...
Aquilino C. On strict polynomial functors: monoidal structure and Cauchy filtration. (Ergänzte Versi...
In the article [8], Janelidze introduced the concept of a double central exten- sion in order to ana...
If G is an affine algebraic group over a field F, and M is a finite-dimensional Fvector space, then ...
Let G be a semisimple simply connected linear algebraic group over an algebraically closed field k o...
Abstract. With Fq a nite eld of characteristic p, let F(q) be the category whose objects are functor...
In this thesis, we apply homological methods to the study of groups in two ways: firstly, we general...
To any almost faithful representation of a complex, connected, reductive algebraic group $G$ of high...
La thèse comprend une version abrégée en anglais.In this thesis, we study homological and cohomologi...
We study the homological algebra in the category $\mathcal{P}_p$ of strict polynomial functors of de...
We uncover several general phenomenas governing functor homology over additive categories. In partic...