On the Lambda-cotorsion subgroup of the Selmer group
Abstract
Let E be an elliptic curve defined over a number field K with supersingular reduction at all primes of K above p. If K∞/K is a Zp-extension such that E(K∞)[p∞] is finite and H2(GS(K∞), E[p∞])=0, then we prove that the -torsion subgroup of the Pontryagin dual of Selp∞(E/K∞) is pseudo-isomorphic to the Pontryagin dual of the fine Selmer group of E over K∞. This is the Galois-cohomological analog of a flat-cohomological result of Wingberg.
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