On the genus of a maximal curve

Abstract

Previous results on genera g of Fq2-maximal curves are improved: (1) Either g≤ (q2-q+4)/6, or g=(q-1)2/4, or g=q(q-1)/2; (2) The hypothesis on the existence of a particular Weierstrass point in at is proved; (3) For q 13, q 13, no Fq2-maximal curve of genus (q-1)(q-2)/3 exists; (4) For q 23, q 11, the non-singular Fq2-model of the plane curve of equation yq+y=x(q+1)/3 is the unique Fq2-maximal curve of genus g=(q-1)(q-2)/6; (5) Assume ()=5, and char()≥ 5. For q 14, q≥ 17, the Fermat curve of equation x(q+1)/2+y(q+1)/2+1=0 is the unique Fq2-maximal curve of genus g=(q-1)(q-3)/8. For q 34, q 19, there are exactly two Fq2-maximal curves of genus g=(q-1)(q-3)/8, namely the above Fermat curve and the non-singular Fq2-model of the plane curve of equation yq+y=x(q+1)/4. The above results provide some new evidences on maximal curves in connection with Castelnuovo's bound and Halphen's theorem, especially with extremal curves; see for instance the conjecture stated in Introduction.

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