Chabauty--Kim, finite descent, and the Section Conjecture for locally geometric sections

Abstract

Let X be a smooth projective curve of genus ≥2 over a number field. A natural variant of Grothendieck's Section Conjecture postulates that every section of the fundamental exact sequence for X which everywhere locally comes from a point of X in fact globally comes from a point of X. We show that X/Q satisfies this version of the Section Conjecture if it satisfies Kim's Conjecture for almost all choices of auxiliary prime p, and give the appropriate generalisation to S-integral points on hyperbolic curves. This gives a new "computational" strategy for proving instances of this variant of the Section Conjecture, which we carry out for the thrice-punctured line over Z[1/2].