On the corank of the fine Selmer group of an elliptic curve over a Zp-extension
Abstract
Let p be an odd prime and F∞ be a Zp-extension of a number field F. Given an elliptic curve E over F, we study the structure of the fine Selmer group over F∞. It is shown that under certain conditions, the fine Selmer group is a cofinitely generated module over Zp and furthermore, we obtain an upper bound for its corank (i.e., the λ-invariant), in terms of various local and global invariants.
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