Zero repulsion in families of elliptic curve L-functions and an observation of S. J. Miller
arXiv:1109.0224 · doi:10.1112/blms/bds063
Abstract
We provide a theoretical explanation for an observation of S. J. Miller that if L(s,E) is an elliptic curve L-function for which L(1/2, E) is nonzero, then the lowest lying zero of L(s,E) exhibits a repulsion from the critical point which is not explained by the standard Katz-Sarnak heuristics. We establish a similar result in the case of first-order vanishing.
9 pages, 2 figures