manYPoints

Submitted by	C. Ritzenthaler
Date	04-07-2009
Reference	Jean-Pierre Serre Résumé des cours de 1983-1984 Annuaire du College de France (1984), 79-83. Reprinted in Vol. 3 of Jean-Pierre Serre, OEvres, Collected Papers. Springer- Verlag, New York (1985).
Comments	This number of points is reached by the curve x^4+y^4+z^4+2(3x^2y^2+4y^2z^2+4x^2z^2)=0 (see J-P. Serre, Rational points on curves over finite fields, Lectures given at Harvard University, 1985. Notes by F. Q. Gouvêa, p.64-68). Its Weil polynomial is (X^2+4X+11)(X^2+6X+11)^2. Its automorphism group (over F_11 and geometric) is Z/2*Z/2.
Tags	Explicit curves

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Submitted by	C. Ritzenthaler
Date	05-26-2009
Reference	Karl-Otto Stöhr, José Felipe Voloch Weierstrass points and curves over finite fields Proc. London Math. Soc. (3) Vol. 52, No. 1 (1986) 1–19
Comments	This is the so-called Voloch's bound "2q+6" for genus 3 curves (q <> 8 and 9). See loc. cit. Proposition 3.1 and also "Curves of genus 3 over small finite fields" by J. Top Prop.2.1 item b)
Tags	None

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