An analogue of irreducible cuspidal representations for the group PGL(2) over a two-dimensional local field

Abstract

Let F be a local non-archimedian field of odd residue characteristic and let G=PGL(2). In this paper we study an analog of irreducible cuspidal representations of the group G(F) when F is replaced by the field K=F((t)). The story turns out to be similar to the classical case, but also with some differences. We present a construction of such representations essentially (up to a small subtlety) starting from a quadratic extension L of K and a character θ:L*/K* C* which is not Galois invariant. We also show that the restriction of the representations we construct to the group P(K) (here P is a Borel subgroup of PGL(2)) is irreducible. However, contrary to the classical case it turns out that these restrictions are not isomorphic to the "standard" irreducible cuspidal representation of P(K). In the Appendix we propose a notion of cuspidality for smooth representations of the group H(K) for an arbitrary split reductive group H.