manYPoints – Table of Curves with Many Points
Entry details for q =
3
3
= 27
, g =
11
Table
About
Recent changes
References
Username
Password
Log in
Register
Lower bound
N
min
= 104
Earlier entry
Submitted by
Everett Howe
Date
06-12-2023
Reference
Not available
Comments
Let r be an element of GF(27) with r^3 - r + 1 = 0 and let
f := (x^2 + r*x + 2) * (x^2 + r^9*x + r^3) * (x^2 + r^25*x + 2);
g1 := x^4 + r^9*x^3 + r^17*x^2 + r^16*x + r^17;
g2 := x^4 + r^12*x^3 + r^10*x^2 + r*x + r^23;
Then the curve defined by
y^2 = f*g1
z^2 = f*g2
has genus 11 and has 104 points.
This example was found by searching through curves of the given form.
Tags
Analysis and enumeration, Towers of curves with many points
User comments
No comments have been made.
Upper bound
N
max
= 133
Earlier entry
Later entry
Submitted by
Everett Howe
Date
04-14-2010
Reference
E. W. Howe, K. E. Lauter
Improved upper bounds for the number of points on curves over finite fields
Ann. Inst. Fourier (Grenoble) 53 (2003) 1677–1737.
Comments
Tags
None
User comments
No comments have been made.