Finding rational points on bielliptic genus 2 curves
We discuss a technique for trying to find all rational points on curves of the form $Y^2 = f_3 X^6 + f_2 X^4 + f_1 X^2 + f_0$, where the sextic has nonzero discriminant. This is a bielliptic curve of genus 2. When the rank of the Jacobian is 0 or 1, Chabauty's Theorem may be applied. However, w...
| Main Authors: | , |
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| Format: | Journal article |
| Published: |
1999
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