Differences between revisions 1 and 4 (spanning 3 versions)
 ⇤ ← Revision 1 as of 2010-06-30 15:13:46 → Size: 170 Editor: GaganSekhon Comment: ← Revision 4 as of 2010-06-30 15:22:13 → ⇥ Size: 631 Editor: GaganSekhon Comment: Deletions are marked like this. Additions are marked like this. Line 1: Line 1: list st of Elliptic curves which for which ρE,2 is surjective mod 2 but not mod 4. I used a Heuristic approach to narrow down the list of elliptic curves for which $\rho_{2,E}$ is surjective mod 2 but not mod 4 or $\rho_{2,E}$ is surjective mod 4 but not mod. [[attachment:2not4or4not8v3.sage|2not4or4not8v3.sage]] Line 3: Line 3: List of Elliptic curves which for which ρE,2 is surjective mod 4 but not mod 8. The results of the above program for 2not4 curves is [[attachment:li4.sobj|li4.sobj]]I have verified the results of 2not4 list, using a galois approach, which involves compute the order of the Gal(Q(E[4])/Q). The program I used is [[attachment:2not4galoisapproach.sage|2not4galoisapproach.sage]]The results of the above program for 2not4 curves is [[attachment:li8.sobj|li8.sobj]]

I used a Heuristic approach to narrow down the list of elliptic curves for which \rho_{2,E} is surjective mod 2 but not mod 4 or \rho_{2,E} is surjective mod 4 but not mod. 2not4or4not8v3.sage

The results of the above program for 2not4 curves is li4.sobj

I have verified the results of 2not4 list, using a galois approach, which involves compute the order of the Gal(Q(E[4])/Q). The program I used is 2not4galoisapproach.sage

The results of the above program for 2not4 curves is li8.sobj

GaganSekhon (last edited 2011-02-12 05:15:41 by GaganSekhon)