Courtois, Gilles (1957-.... ; mathématicien)
- Mathématiques
- Grenoble
- eem2021
- contraintes de courbures et espaces métriques
- curvature constraints and spaces of metrics
- Gromov-Hyperbolic spaces
- Grenoble
- eem2021
- contraintes de courbures et espaces métriques
- curvature constraints and spaces of metrics
- Gromov-Hyperbolic spaces
- Grenoble
- eem2021
- contraintes de courbures et espaces métriques
- curvature constraints and spaces of metrics
Vidéos
G. Courtois - Compactness and Finiteness Results for Gromov-Hyperbolic Spaces 4
This is a series of lectures on Bishop--Gromov's type inequalities adapted to metric spaces. We consider the case of Gromov-hyperbolic spaces and draw consequences of these inequalities such as
G. Courtois - Compactness and Finiteness Results for Gromov-Hyperbolic Spaces 2
This is a series of lectures on Bishop--Gromov's type inequalities adapted to metric spaces. We consider the case of Gromov-hyperbolic spaces and draw consequences of these inequalities such as
G. Courtois - Compactness and Finiteness Results for Gromov-Hyperbolic Spaces 3
This is a series of lectures on Bishop--Gromov's type inequalities adapted to metric spaces. We consider the case of Gromov-hyperbolic spaces and draw consequences of these inequalities such as
G. Courtois - Compactness and Finiteness Results for Gromov-Hyperbolic Spaces 1
This is a series of lectures on Bishop--Gromov's type inequalities adapted to metric spaces. We consider the case of Gromov-hyperbolic spaces and draw consequences of these inequalities such as
Gilles Courtois - The Margulis lemma, old and new (Part 2)
The Margulis lemma describes the structure of the group generated by small loops in the fundamental group of a Riemannian manifold, thus giving a picture of its local topology. Originally stated for
Gilles Courtois - The Margulis lemma, old and new (Part 5)
The Margulis lemma describes the structure of the group generated by small loops in the fundamental group of a Riemannian manifold, thus giving a picture of its local topology. Originally stated for
Gilles Courtois - The Margulis lemma, old and new (Part 3)
The Margulis lemma describes the structure of the group generated by small loops in the fundamental group of a Riemannian manifold, thus giving a picture of its local topology. Originally stated for
Gilles Courtois - The Margulis lemma, old and new (Part 1)
The Margulis lemma describes the structure of the group generated by small loops in the fundamental group of a Riemannian manifold, thus giving a picture of its local topology. Originally stated for
Gilles Courtois - The Margulis lemma, old and new (Part 4)
The Margulis lemma describes the structure of the group generated by small loops in the fundamental group of a Riemannian manifold, thus giving a picture of its local topology. Originally stated for