Fourier transform from the symmetric square representation of PGL2 and SL2

Abstract

Let G be a connected reductive group over Fq and let :G→ GLn be an algebraic representation of the dual group G. Assuming that G and are defined over Fq, Braverman and Kazhdan defined an operator on the space C(G(Fq)) of complex valued functions on G(Fq). In this paper we are interested in the case where G is either SL2 or PGL2 and is the symmetric square representation of G. We construct a natural G× G-equivariant embedding G=G and an involutive operator (Fourier transform) FG on the space of functions C(G(Fq)) that extends Braverman-Kazhdan's operator.