Arithmetic subgroups of Chevalley group schemes over function fields I: quotients of the Bruhat-Tits building by \P\-arithmetic subgroups
Abstract
Let G be a reductive Chevalley group scheme (defined over Z). Let C be a smooth, projective, geometrically integral curve over a field F. Let P be a closed point on C. Let A be the ring of functions that are regular outside P . The fraction field k of A has a discrete valuation =P: k× → Z associated to P. In this work, we study the action of the group G(A) of A-points of G on the Bruhat-Tits building X=X(G,k,P) in order to describe the structure of the orbit space G(A) X. We obtain that this orbit space is the ``gluing'' of a closed connected CW-complex with some sector chambers. The latter are parametrized by a set depending on the Picard group of C \P\ and on the rank of G. Moreover, we observe that any rational sector face whose tip is a special vertex contains a subsector face that embeds into this orbit space.
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