On maximal curves
Abstract
We study arithmetical and geometrical properties of maximal curves, that is, curves defined over the finite field Fq2 whose number of Fq2-rational points reaches the Hasse-Weil upper bound. Under a hypothesis on non-gaps at a rational point, we prove that maximal curves are Fq2-isomorphic to yq + y = xm, for some m ∈ Z+. As a consequence we show that a maximal curve of genus g=(q-1)2/4 is Fq2-isomorphic to the curve yq + y = x(q+1)/2.
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