CM values of higher automorphic Green functions for orthogonal groups

Abstract

Gross and Zagier conjectured that the CM values (of certain Hecke translates) of the automorphic Green function Gs(z1,z2) for the elliptic modular group at positive integral spectral parameter s are given by logarithms of algebraic numbers in suitable class fields. We prove a partial average version of this conjecture, where we sum in the first variable z1 over all CM points of a fixed discriminant d1 (twisted by a genus character), and allow in the second variable the evaluation at individual CM points of discriminant d2. This result is deduced from more general statements for automorphic Green functions on Shimura varieties associated with the group GSpin(n,2). We also use our approach to prove a Gross-Kohnen-Zagier theorem for higher Heegner divisors on Kuga-Sato varieties over modular curves.