One-level densities in families of Gr\"ossencharakters associated to CM elliptic curves
Abstract
We study the low-lying zeros of a family of L-functions attached to the CM elliptic curve Ed \;:\; y2 = x3 - dx, for each odd and square-free integer d. Specifically, upon writing the L-function of Ed as L(s-12, d) for the appropriate Gr\"ossencharakter d of conductor fd, we consider the collection Fd of L-functions attached to d,k, k ≥ 1, where for each integer k, d, k denotes the primitive character inducing dk. We observe that 25\% of the L-functions in Fd have negative root number. Fd is thus not one of the essentially homogeneous families of the Universality Conjecture of Sarnak, Shin and Templier, with unitary, symplectic or orthogonal (odd or even) symmetry type. By computing the one-level density in the family of L-functions in Fd with conductor at most K2 N (fd), we find that Fd naturally decomposes into subfamilies: more specifically, a collection of symplectic (L(s, d,k) for k α 8, α even) and orthogonal (L(s, d,k) for k α 8, α odd) subfamilies. For each such subfamily, we moreover compute explicit lower order terms in decreasing powers of (K2 N(fd)).
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