On the Cubic Shimura lift to PGL(3): The Fundamental Lemma

Abstract

The classical Shimura correspondence lifts automorphic representations on the double cover of SL2 to automorphic representations on PGL2. Here we take key steps towards establishing a relative trace formula that would give a new global Shimura lift, from the triple cover of SL3 to PGL3, and also characterize the image of the lift. The characterization would be through the nonvanishing of a certain global period involving a function in the space of the automorphic minimal representation SO8 for split SO8(A), consistent with a 2001 conjecture of Bump, Friedberg and Ginzburg. In this paper, we first analyze a global distribution on PGL3(A) involving this period and show that it is a sum of factorizable orbital integrals. The same is true for the Kuznetsov distribution attached to the triple cover of SL3(A). We then match the corresponding local orbital integrals for the unit elements of the spherical Hecke algebras; that is, we establish the Fundamental Lemma.