Masures are generalizations of Bruhat-Tits buildings. They were introduced by Gaussent and Rousseau in order to study Kac-Moody groups over valued fields. We prove that the intersection of two apartments of a masure is convex. Using this, we simplify the axiomatic definition of masures given by Rousseau
AbstractWe show that, if a building is endowed with its complete system of apartments, and if each p...
In [Ser04], J.P. Serre defined completely reducible subcomplexes of spherical buildings in order to ...
Abstract. We prove an analogue of Kostants convexity theorem for thick affine buildings and give an ...
Masures are generalizations of Bruhat-Tits buildings. They were introduced by Gaussent and Rousseau ...
International audienceMasures are generalizations of Bruhat-Tits buildings. They were introduced to ...
Masures are generalizations of Bruhat-Tits buildings. They were introduced to study Kac-Moody groups...
This work aims at generalizing Bruhat-Tits theory to Kac-Moody groups over local fields. We thus try...
Le but de ce travail est d’étendre la théorie de Bruhat-Tits au cas des groupes de Kac-Moody sur des...
Masures are generalizations of Bruhat-Tits buildings introduced by Gaussent and Rousseau in order to...
International audienceA masure (a.k.a affine ordered hovel) I is a generalization of the Bruhat-Tits...
Masures were introduced in 2008 by Gaussent and Rousseau in order to study Kac-Moody groups over loc...
In [6], J.P. Serre defined completely reducible subcomplexes of spherical buildings in order to stud...
Masures were introduced in 2008 by Gaussent and Rousseau in order to study Kac-Moody groups over loc...
AbstractWe show that, if a building is endowed with its complete system of apartments, and if each p...
In [Ser04], J.P. Serre defined completely reducible subcomplexes of spherical buildings in order to ...
Abstract. We prove an analogue of Kostants convexity theorem for thick affine buildings and give an ...
Masures are generalizations of Bruhat-Tits buildings. They were introduced by Gaussent and Rousseau ...
International audienceMasures are generalizations of Bruhat-Tits buildings. They were introduced to ...
Masures are generalizations of Bruhat-Tits buildings. They were introduced to study Kac-Moody groups...
This work aims at generalizing Bruhat-Tits theory to Kac-Moody groups over local fields. We thus try...
Le but de ce travail est d’étendre la théorie de Bruhat-Tits au cas des groupes de Kac-Moody sur des...
Masures are generalizations of Bruhat-Tits buildings introduced by Gaussent and Rousseau in order to...
International audienceA masure (a.k.a affine ordered hovel) I is a generalization of the Bruhat-Tits...
Masures were introduced in 2008 by Gaussent and Rousseau in order to study Kac-Moody groups over loc...
In [6], J.P. Serre defined completely reducible subcomplexes of spherical buildings in order to stud...
Masures were introduced in 2008 by Gaussent and Rousseau in order to study Kac-Moody groups over loc...
AbstractWe show that, if a building is endowed with its complete system of apartments, and if each p...
In [Ser04], J.P. Serre defined completely reducible subcomplexes of spherical buildings in order to ...
Abstract. We prove an analogue of Kostants convexity theorem for thick affine buildings and give an ...