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We prove an Ω -result for the quadratic Dirichlet L L -function | L (1 / 2, χ P) | |L (1/2, P) | over irreducible polynomials P P associated with the hyperelliptic curve of genus g g over a fixed finite field F q Fq in the large genus limit. In particular, we showed that for any ϵ ∈ (0, 1 / 2) (0, 1/2), \ max P ∈ P 2 g + 1 | L (1 / 2, χ P) | ≫ exp ( ( (1 / 2 − ϵ) ln q + o (1) ) g ln 2 g ln g), {₂₆+₁}|L (1/2, P) | ( ( (1/2-) q+o (1) ) {g ₂ g g}), \ where P 2 g + 1 P₂₆+₁ is the set of all monic irreducible polynomials of degree 2 g + 1 2g+1. This matches with the order of magnitude of the Bondarenko–Seip bound.
Darbar et al. (Fri,) studied this question.
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