Álvaro Lozano-Robledo
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Registered User
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Alvaro Lozano-Robledo
http://www.math.uconn.edu/~alozano/ Assistant Professor of Mathematics Associate Director of the Quantitative Learning Center Department of Mathematics, Univ. of Connecticut =================================================== |
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Apr 18 |
comment |
Inertia subgroup in the ordinary reduction case when $p=2$ @Rabelais, if I understand your comment correctly, you say that any finite subgroup of $(\ast \ast; 0 1) \bmod 8$ may appear as inertia for some $E/K$ in $\text{Gal}(K(E[8])/K)$. But what about the $2$-adic $I_K$? Is it necessarily a subgroup of finite index of a $B(\Phi,\Psi)$ as I defined above? |
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Apr 15 |
revised |
Inertia subgroup in the ordinary reduction case when $p=2$ added 2 characters in body |
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Apr 12 |
revised |
Inertia subgroup in the ordinary reduction case when $p=2$ added 17 characters in body |
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Apr 12 |
revised |
Inertia subgroup in the ordinary reduction case when $p=2$ fixed TeX |
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Apr 12 |
revised |
Inertia subgroup in the ordinary reduction case when $p=2$ Added a remark about the field of definition of E; added 8 characters in body; deleted 3 characters in body |
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Apr 12 |
asked | Inertia subgroup in the ordinary reduction case when $p=2$ |
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Mar 14 |
revised |
Tameness criterion in the reducible case added 2 characters in body |
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Feb 23 |
awarded | ● Yearling |
