Curves of fixed gonality with many rational points
Abstract
Given an integer γ≥ 2 and an odd prime power q we show that for every large genus g there exists a non-singular curve C defined over Fq of genus g and gonality γ and with exactly γ(q+1) Fq-rational points. This is the maximal number of rational points possible. This answers a recent conjecture by Faber--Grantham. Our methods are based on curves on toric surfaces and Poonen's work on squarefree values of polynomials.
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