Horizontal non-vanishing of Heegner points and toric periods

Abstract

Let F/Q be a totally real field and A a modular 2-type abelian variety over F. Let K/F be a CM quadratic extension. Let be a class group character over K such that the Rankin-Selberg convolution L(s,A,) is self-dual with root number -1. We show that the number of class group characters with bounded ramification such that L'(1, A, ) ≠ 0 increases with the absolute value of the discriminant of K. We also consider a rather general rank zero situation. Let π be a cuspidal cohomological automorphic representation over 2(F). Let be a Hecke character over K such that the Rankin-Selberg convolution L(s,π,) is self-dual with root number 1. We show that the number of Hecke characters with fixed ∞-type and bounded ramification such that L(1/2, π, ) ≠ 0 increases with the absolute value of the discriminant of K. The Gross-Zagier formula and the Waldspurger formula relate the question to horizontal non-vanishing of Heegner points and toric periods, respectively. For both situations, the strategy is geometric relying on the Zariski density of CM points on self-products of a quaternionic Shimura variety. The recent result Ts, YZ, AGHP on the Andr\'e-Oort conjecture is accordingly fundamental to the approach.