Explicit Subconvexity Estimates for Dirichlet L-functions
Abstract
Given a Dirichlet character modulo q and its associated L-function, L(s,), we provide an explicit version of Burgess' estimate for |L(s, )|. We use partial summation to provide bounds along the vertical lines s = 1 - r-1, where r is a parameter associated with Burgess' character sum estimate. These bounds are then connected across the critical strip using the Phragm\'en--Lindel\"of principle. In particular, for σ ∈ [12, 910], we establish |L(σ + it, )| ≤ (1.105) (0.692)σ q3180-25σ(q)3316-98σ |σ + it|.
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