Selmer groups for elliptic curves in Zld-extensions of function fields of characteristic p
Abstract
Let F be a function field of characteristic p>0, /F a Galois extension with Gal(/F) ld (for some prime l≠ p) and E/F a non-isotrivial elliptic curve. We study the behaviour of Selmer groups SelE(L)r (r any prime) as L varies through the subextensions of via appropriate versions of Mazur's Control Theorem. As a consequence we prove that SelE()r is a cofinitely generated (in some cases cotorsion) r[[Gal(/F)]]-module.
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