Improved bounds for integral points on modular curves using Runge's method

Abstract

Consider a modular curve XG defined over a number field K, where G is a subgroup of GL2(Z/NZ) with N>2. The curve XG comes with a morphism j: XG P1K=A1K \∞\ to the j-line. For a finite set of places S of K that satisfies a certain condition, Runge's method shows that there are only finitely many points P ∈ XG(K) for which j(P) lies in the ring OK,S of S-units of K. We prove an explicit version which shows that if j(P)∈ OK,S for some P∈ XG(K), then the absolute logarithmic height of j(P) is bounded above by N12 N. Explicits upper bounds have already been obtained by Bilu and Parent though they are not polynomial in N. The modular functions needed to apply Runge's method are constructing using Eisenstein series of weight 1.