Optimal plane curves of degree q-1 over a finite field

Abstract

Let q≥ 5 be a prime power. In this note, we prove that if a plane curve X of degree q - 1 defined over Fq without Fq-linear components attains the Sziklai upper bound (d-1)q+1 = (q - 1)2 for the number of its Fq-rational points, then X is projectively equivalent over Fq to the curve C(α,β,γ) : α Xq - 1 + β Yq - 1 + γ Zq - 1 = 0 for some α, β, γ ∈ Fq* such that α + β + γ = 0. This completes the classification of curves that are extremal with respect to the Sziklai bound. Also, since the Sziklai bound is equal to the St\"ohr-Voloch's bound for plane curves of degree q - 1, our main result classifies the Fq-Frobenius classical extremal plane curves of degree q - 1.

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