Exceptional Siegel-Weil theorems for compact Spin8

Abstract

Let E be a cubic \'etale extension of the rational numbers which is totally real, i.e., E R R × R × R. There is an algebraic Q-group SE defined in terms of E, which is semisimple simply-connected of type D4 and for which SE(R) is compact. We let GE denote a certain semisimple simply-connected algebraic Q-group of type D4, defined in terms of E, which is split over R. Then GE × SE maps to quaternionic E8. This latter group has an automorphic minimal representation, which can be used to lift automorhpic forms on SE to automorphic forms on GE. We prove a Siegel-Weil theorem for this dual pair: I.e., we compute the lift of the trivial representation of SE to GE, identifying the automorphic form on GE with a certain degenerate Eisenstein series. Along the way, we prove a few more "smaller" Siegel-Weil theorems, for dual pairs M × SE with M ⊂eq GE. The main result of this paper is used in the companion paper "Exceptional theta functions and arithmeticity of modular forms on G2" to prove that the cuspidal quaternionic modular forms on G2 have an algebraic structure, defined in terms of Fourier coefficients.