On the cubic Shimura lift to PGL(3): Hecke correspondences

Abstract

In this paper we establish a new Fundamental Lemma for Hecke correspondences. Let F be a local field containing the cube roots of unity. We exhibit an algebra isomorphism of the spherical Hecke algebra of PGL3(F) and the spherical Hecke algebra of anti-genuine functions on the cubic cover G' of SL3(F). Then we show that there is a matching (up to a specific transfer factor) of distributions on the two groups for all functions that correspond under this isomorphism. On PGL3(F) the distributions are relative distributions attached to a period involving the minimal representation on SO8, while on G' they are metaplectic Kuznetsov distributions. This Fundamental Lemma is a key step towards establishing a relative trace formula that would give a new global Shimura lift from genuine automorphic representations on the triple cover of SL3 to automorphic representations on PGL3, and also characterize the image of the lift by means of a period. It extends the matching for the unit elements of the Hecke algebras established by the authors in prior work.