Explicit Chabauty-Kim theory for the thrice punctured line in depth two

Abstract

Let X= P1 \0,1,∞\, and let S denote a finite set of prime numbers. In an article of 2005, Minhyong Kim gave a new proof of Siegel's theorem for X: the set X(Z[S-1]) of S-integral points of X is finite. The proof relies on a `nonabelian' version of the classical Chabauty method. At its heart is a modular interpretation of unipotent p-adic Hodge theory, given by a tower of morphisms hn between certain Qp-varieties. We set out to obtain a better understanding of h2. Its mysterious piece is a polynomial in 2|S| variables. Our main theorem states that this polynomial is quadratic, and gives a procedure for writing its coefficients in terms of p-adic logarithms and dilogarithms.