Modular Chabauty: Effective S-Integral Point Computation On Curves with Elliptic Fibrations

Abstract

We present a practical, unconditional algorithm for determining the S-integral points on any elliptic moduli problem Y/Z[1/S] -- that is, on any geometrically connected curve carrying a non-isotrivial elliptic fibration E Y. The associated map M Y M1,1 (the modular period map) plays the role ordinarily filled by a p-adic period map in Chabauty-type methods. Our Modular Chabauty method studies the image and fibres of M, and proceeds in two steps: an Effective Shafarevich step, in which we combine the modularity theorem with Cremona's enumeration of elliptic curves by conductor and list all rational elliptic curves with good reduction outside S; and a Fibre Computation step, in which we compute the S-integral points in the corresponding fibre of M. A Python/Sage implementation computes Y(Z[1/S]) for Y=P1\0,1,∞\ and for every modular curve Y1(N) with 4 N 10 or N=12, for all sets S with Πp∈ S p2 5· 105, within 3.5 seconds on a standard computer.