The Degenerate Eisenstein Series Attached to the Heisenberg Parabolic Subgroups of Quasi-Split Forms of Spin8

Abstract

In previews works, joint with N. Gurevitch, a family of Rankin-Selberg integrals were shown to represent the twisted standard L-function L(s,π,,st) of a cuspidal representation π of the exceptional group of type G2. This integral representation binds the analytic behavior of this L-functions with that of a degenerate Eisenstein series defined over the family of quasi-split forms of Spin8 associated to an induction from a character on the Heisenberg parabolic subgroup. This paper is divided into two parts. In part 1 we study the poles of this degenerate Eisenstein series in the right half plane Re(s)>0. In part 2 we use the results of part 1 to give a criterion for π to be a CAP representation with respect to the Borel subgroup in terms of poles of L(s,π,,st). We also settle a conjecture of J. Hundley and D. Ginzburg and prove a few results relating the analytic behavior of L(s,π,,st) and the set of Fourier coefficients supported by π.