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| Submitted by |
Gerrit Oomens |
| Date |
01-01-1900 |
| Reference |
Michael Zieve
Private communication, 1999
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Comments
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| Tags |
Explicit curves |
User comments
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Explicit examples
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Everett Howe
04-16-2010 06:48
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While searching for genus-4 double covers of the elliptic curve E: y^2 + x*y = x^3 + x having more than 72 points, we found a number of such double covers that have 71 points.
Let r in F_32 satisfy r^5 + r^2 + 1 = 0. The double cover of E defined by z^2 + z = (r^27*x^2 + r^13*x*y + r^14*x + r^25)/(x + r^30*y + r^27) has 71 rational points, and has real Weil polynomial (x + 7) * (x + 9) * (x + 11)^2.
The double cover defined by z^2 + z = (r^26*x^2 + r^29*x*y + r^16*x + r^18)/(x + r^28*y + r^4) has 71 points and has real Weil polynomial (x + 11) * (x^3 + 27*x^2 + 239*x + 691).
The double cover defined by z^2 + z = (r^14*x^2 + r^24*x + r^18)/(x + r) has 71 points and has real Weil polynomial (x + 9)^3 * (x + 11).
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| Submitted by |
Gerrit Oomens |
| Date |
01-01-1900 |
| Reference |
Michael Zieve
Private communication, 1999
|
Comments
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|
| Tags |
None |
User comments
No comments have been made.
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