Allan J. Silberger and Ernst-Wilhelm Zink
The characters of the generalized Steinberg representations of finite general linear groups on the regular elliptic set
Preprint series: Institut für Mathematik, Humboldt-Universität zu Berlin (ISSN 0863-0976)

MSC:

22E50 Representations of Lie and linear algebraic groups over local fields

11T24 Other character sums and Gauss sums

Abstract: Let k be a finite field, k_n|k the degree n extension of k, and G=GL_n(k) the general linear group with entries in
k. This paper studies the ``generalized Steinberg" (GS)
representations of G and proves the equivalence of several different characterizations for this class of representations. As our main result we show that the union of the class of cuspidal and GS representations of G is in natural one-one correspondence with the set of Galois orbits of characters of k<sub>n</sub><sup>x</sup>, the regular orbits of course corresponding to the cuspidal representations.
Besides using Green's character formulas to define GS
representations, we characterize GS representations by associating to them idempotents in certain commuting algebras corresponding to parabolic inductions and by showing that GS representations are the sole components of these induced representations which are ``generic" (have Whittaker vectors).
This paper will appear in Transactions of the American
Mathematical Society.

Keywords: reductive group, general linear group, finite field, character, unitary representation, Steinberg representation, Whittaker vector, generic representation