The GL+1(R) Hecke-Baxter operator: principal series representations

Abstract

Previously introduced the GL+1(R) Hecke-Baxter operator is a one-parameter family of elements in the commutative spherical Hecke algebra H(GL+1(R),O+1). Its action on spherical vectors in spherical principle series representations of GL+1(R) is given by multiplication by the Archimedean L-factors associated to these representations. In this note we propose an extension of the construction to other (non-spherical) GL+1(R) principle series representations providing a relevant generalization of the notions of spherical vector, commutative spherical Hecke algebra and the Hecke-Baxter operator to the general case. Action of the introduced Hecke-Baxter operator on the generalized spherical vectors is given by multiplication by the Archiemdean L-factor associated to the corresponding principle series representation of GL+1(R).