Fine Selmer Groups, Heegner points and Anticyclotomic $\mathbb{Z}_p$-extensions

Abstract: Let $E/\mathbb{Q}$ be an elliptic curve, $p$ a prime and $K_{\infty}/K$ the anticyclotomic $\mathbb{Z}p$-extension of a quadratic imaginary field $K$ satisfying the Heegner hypothesis. In this paper we make a conjecture about the fine Selmer group over $K{\infty}$. We also make a conjecture about the structure of the module of Heegner points in $E(K_{\mathfrak{p}{\infty}})/p$ where $K{\mathfrak{p}{\infty}}$ is the union of the completions of the fields $K_n$ at a prime of $K{\infty}$ above $p$. We prove that these conjectures are equivalent. When $E$ has supersingular reduction at $p$ we also show that these conjectures are equivalent to the conjecture in our earlier work. Assuming these conjectures when $E$ has supersingular reduction at $p$, we prove various results about the structure of the Selmer group over $K_{\infty}$.