Constructing super-expanders from actions of higher rank lattices
By Tim de Laat
Noncommutative rigidity of higher rank lattices - Part 4
By Cyril Houdayer
Noncommutative rigidity of higher rank lattices - Part 5
By Cyril Houdayer
Appears in collection : Buildings and Affine Grassmannians / Immeubles et grassmanniennes affines
The goal of this lecture is to present the construction of the Bruhat-Tits buildings attached to a quasi-split (that is admitting a Borel subgroup) semisimple group G defined over an henselian discretly valued field K and also the construction of the parahoric group schemes parametrized by the points of the buildings. The building part is [BT1] and the group scheme part corresponds to the four first sections of [BT2] but could also be treated by Yu's method [Y] namely by using Raynaud's theory of group schemes [BLR].