manYPoints – Table of Curves with Many Points
Entry details for q =
2
6
= 64
, g =
5
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Lower bound
N
min
= 133
Earlier entry
Later entry
Submitted by
Everett Howe
Date
04-16-2010
Reference
Everett W. Howe, Kristin E. Lauter
New methods for bounding the number of points on curves over finite fields
Geometry and Arithmetic (C. Faber, G. Farkas, and R. de Jong, eds.), European Mathematical Society, 2012, pp. 173–212
Comments
Let s in F_8 satisfy s^3 + s + 1 = 0. Let E be the elliptic curve over F_8 defined by y^2 + y = x^3, and let C be the degree-3 Kummer cover of E defined by z^3 = ((s*x^2 + s^6*x + s^3)*y + (s^6*x^3 + x^2 + s^6*x))/(x^2 + x + s^5). Then C is a curve of genus 5 with real Weil polynomial equal to x * (x^4 - 6*x^2 + 3), and C has 133 points over F_64.
This curve was found by a computer search of degree-3 Kummer extensions of E of genus 5.
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Explicit curves
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Upper bound
N
max
= 145
Later entry
Submitted by
Gerrit Oomens
Date
01-01-1900
Reference
Michael Zieve
Private communication, 1999
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