Conditional algorithmic Mordell

Abstract: We specify a Turing machine $T_{\text{Mordell}}$ with the following properties. 1. On input $(K,C/K)$, with $K/\mathbb{Q}$ a number field and $C/K$ a smooth projective hyperbolic curve, if $T_{\text{Mordell}}$ terminates, then it outputs $C(K)$. 2. The Hodge, Tate, and Fontaine-Mazur conjectures imply that $T_{\text{Mordell}}$ always terminates. Similarly we specify a Turing machine $T_{\text{Shafarevich}}$ with the following properties. 1. On input $(g, K,S, d)$, with $g, d \in \mathbb{Z}^+$, $K/\mathbb{Q}$ a number field, and $S$ a finite set of places of $K$, if $T_{\text{Shafarevich}}$ terminates, then it outputs the finitely many polarized $g$-dimensional abelian varieties $A/K$, with polarization of degree $d$, having good reduction outside $S$. 2. The Hodge, Tate, and Fontaine-Mazur conjectures imply that $T_{\text{Shafarevich}}$ always terminates.