Indecomposable Representations of M(2, Fq), over Fq

Let G be a split semisimple group over a finite field F q , F the field F q (t) of rational functions in t with coefficients in F q and A the adèles of F. We describe the irreducible automorphic representations of G(A) which have non-zero vectors invariant under Iwahori subgroups at two places and u

We consider a group G lying between the special and the general linear group of order 2 over the finite field % O . A representation which arises from a natural action of G on a quotient graph of the Bruhat-Tits tree of G¸(2, % O (( ))) is described and its irreducible components are determined.

We study the spherical Bessel functions of generic representations of a reductive group over finite fields. We show that in the case of GL 2 (F q 2 ), the relation between spherical Bessel functions and Bessel functions gives another characterization of the Shintani lifting.

Given two matrices A and B in GL, ( F,), where q is a power of a prime and Fq is the finite field with q elements, we say that A and B are congruent if there is a matrix C in GL2( F,) such that A = CTBC. We show that there are q + 3 congruence classes in GL,(F,) for odd q and q + 1 classes for even

We characterize continuous linear endomorphisms which commute with a fixed Carlitz difference operator on the space of continuous F q -linear functions defined over the completion of F q [T] in terms of a bounded sequence, which is closely related to hyper-differential operators. This leads us to es