The Theta Correspondence, Periods of Automorphic Forms and Special Values of Standard Automorphic L-Functions

Abstract

The zeros and poles of standard automorphic L-functions attached to representations of classical groups are linked to the nonvanishing of lifts in the theory of the theta correspondence. The results of this paper show that when a cuspidal representation σ of a symplectic group G lifts to a cuspidal representation π = θ(σ) of an orthogonal group H attached to a quadratic space V of dimension m, the Fourier coefficients of automorphic forms in σ are linked to periods of automorphic forms in π. Consequently, when our results are combined with the Rallis inner product formula in the convergent range or the second term range, we prove a special value formula for the standard automorphic L-function L(s,σ,V) attached to σ (and twisted by the character V of V) at the point sm,2n=m/2-(2n+1)/2 in terms of the Fourier coefficients of automorphic forms in σ and periods of forms in π.