The distribution of the logarithm in an orthogonal and a symplectic family of L-functions

Abstract

We consider the logarithm of the central value L(1/2) in the orthogonal family L(s,f)f ∈ Hk where Hk is the set of weight k Hecke-eigen cusp form for SL2(Z), and in the symplectic family L(s,8d)d D where 8d is the real character associated to fundamental discriminant 8d. Unconditionally, we prove that the two distributions are asymptotically bounded above by Gaussian distributions, in the first case of mean -12 k and variance k, and in the second case of mean 12 D and variance D. Assuming both the Riemann and Zero Density Hypotheses in these families we obtain the full normal law in both families, confirming a conjecture of Keating and Snaith.