Control theorems for fine Selmer groups, and duality of fine Selmer groups attached to modular forms
Abstract
Let O be the ring of integers of a finite extension of Qp. We prove two control theorems for fine Selmer groups of general cofinitely generated modules over O. We apply these control theorems to compare the fine Selmer group attached to a modular form f over the cyclotomic Zp-extension of Q to its counterpart attached to the conjugate modular form f.
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