Akademik Veri Yönetim Sistemi
Arithmetic and Low Dimensional Hyperbolic Spaces, İstanbul, Türkiye, 27 Haziran - 01 Temmuz 2016, ss.2-3
In various arithmetic-geometric applications and in the theory of automorphic forms there are open problems
whose answer can be reduced to a question about finite dimensional representations of SL(2, O), where O is a3
maximal order in a number field or, more generally, an arithmetic Dedekind domain. It is amazing that even
natural questions like for the group of linear characters of such groups did until recently not have a satisfactory
answer.
In the present talk we describe recent progress in the theory of finite dimensional representations of SL(2, O)
for a fairly large class of rings O comprising the rings of integers of local fields and arithmetic Dedekind Dedekind
domains. Amongst other things we describe all linear characters of these groups SL(2, O). We show how to use
the general theory of Weil representations to construct finite dimensional representations of these SL(2, O). We
indicate why these so constructed families of representations possibly contain all finite dimensional representa-
tions with finite image of these SL(2, O) (except for certain O). We finish with some open questions concerning
the classification of the central extensions of these SL(2, O) by the cyclic group of order 2.