Non-vanishing theorems for central L-values of some elliptic curves with complex multiplication II

Abstract

Let q be any prime 7 16, K = Q(-q), and let H be the Hilbert class field of K. Let A/H be the Gross elliptic curve defined over H with complex multiplication by the ring of integers of K. We prove the existence of a large explicit infinite family of quadratic twists of A whose complex L-series does not vanish at s=1. This non-vanishing theorem is completely new when q > 7. Its proof depends crucially on the results established in our earlier paper for the Iwasawa theory at the prime p=2 of the abelian variety B/K, which is the restriction of scalars from H to K of the elliptic curve A.