Explicit lower bounds on |L(1, )|
Abstract
Let denote a primitive, non-quadratic Dirichlet character with conductor q, and let L(s, ) denote its associated Dirichlet L-function. We show that |L(1, )| ≥ 1/(9.12255 (q/π)) for sufficiently large q, and that |L(1, )| ≥ 1/(9.69030 (q/π)) for all q≥2, improving some results of Louboutin. The improvements stem principally from the construction, via simulated annealing, of some real trigonometric polynomials having particularly favorable properties.
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