Discrepancy bounds for the distribution of L-functions near the critical line
Abstract
We investigate the joint distribution of L-functions on the line σ= 12 + 1G(T) and t ∈ [ T, 2T], where T ≤ G(T) ≤ T ( T)2 . We obtain an upper bound on the discrepancy between the joint distribution of L-functions and that of their random models. As an application we prove an asymptotic expansion of a multi-dimensional version of Selberg's central limit theorem for L-functions on σ= 12 + 1G(T) and t ∈ [ T, 2T], where ( T)ε ≤ G(T) ≤ T ( T)2+ε for ε > 0.
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