The -invariants of S-arithmetic subgroups of Borel groups

Abstract

Given a Chevalley group G of classical type and a Borel subgroup B ⊂eq G, we compute the -invariants of the S-arithmetic groups B(Z[1/N]), where N is a product of large enough primes. To this end, we let B(Z[1/N]) act on a Euclidean building X that is given by the product of Bruhat--Tits buildings Xp associated to G, where p runs over the primes dividing N. In the course of the proof we introduce necessary and sufficient conditions for convex functions on CAT(0)-spaces to be continuous. We apply these conditions to associate to each simplex at infinity τ ⊂ ∂∞ X its so-called parabolic building Xτ, which we study from a geometric point of view. Moreover, we introduce new techniques in combinatorial Morse theory, which enable us to take advantage of the concept of essential n-connectivity rather than actual n-connectivity. Most of our building theoretic results are proven in the general framework of spherical and Euclidean buildings. For example, we prove that the complex opposite each chamber in a spherical building contains an apartment, provided is thick enough and Aut() acts chamber transitively on .