On anticyclotomic Selmer groups of elliptic curves

Abstract

Let p≥5 be a prime number and let K be an imaginary quadratic field where p is unramified. Under mild technical assumptions, in this paper we prove the non-existence of non-trivial finite -submodules of Pontryagin duals of signed Selmer groups of a p-supersingular rational elliptic curve over the anticyclotomic Zp-extension of K, where is the corresponding Iwasawa algebra. In particular, we work under the assumption that our plus/minus Selmer groups have -corank 1, so they are not -cotorsion. Our main theorem extends to the supersingular case analogous non-existence results by Bertolini in the ordinary setting; furthermore, since we cover the case where p is inert in K, we refine previous results of Hatley-Lei-Vigni, which deal with p-supersingular elliptic curves under the assumption that p splits in K.

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