Computing actions on cusp forms

Abstract

For positive integers k and N, we describe how to compute the natural action of SL2(Z) on the space of cusp forms Sk((N)), where a cusp form is given by sufficiently many terms of its q-expansion. This will reduce to computing the action of the Atkin--Lehner operator on Sk() for a congruence subgroup 1(N)⊂eq ⊂eq 0(N). Our motivating application of such fundamental computations is to compute explicit models of some modular curves XG.