p-adic Periods and Selmer Scheme Images

Abstract

The Chabauty--Kim method was developed with the aim of approaching effective Faltings', the problem of explicitly determining the finite set of rational points on a hyperbolic curve. This method has seen success with the more particular Quadratic Chabauty method, but this method still applies only to certain curves. Previous applications of Chabauty--Kim beyond the quadratic level, as pursued by the authors, by S. Wewers, and by others, use mixed Tate motives and the p-adic period map of Chatzistamatiou-\"Unver to approach the particular hyperbolic curve P1\0,1,∞\. The main purpose of this article is to lay foundations for extending the above approach to more general hyperbolic curves, in particular by defining an analogous p-adic period map for more general categories of motives and their non-conjectural cousins such as systems of realizations and p-adic Galois representations. We use this to describe a general setup for non-abelian Chabauty for an arbitrary hyperbolic curve. Our period map also connects the study of p-adic iterated integrals with Goncharov's theory of motivic iterated integrals, and allows us to investigate Goncharov's conjectures from a p-adic point of view. In particular, it suggests the possibility of evaluating syntomic regulators by writing elements of K-theory in terms of motivic iterated integrals. Lastly, it forms the basis for a certain generalization of the p-adic period conjecture of Yamashita for mixed Tate motives well-suited to applications in Chabauty--Kim theory.