On Up-congruences for meromorphic modular forms with supersingularity

Abstract

In this paper, we investigate congruences for meromorphic modular forms F which have a pole at a single point z in the fundamental domain of SL2( Z). For a prime p with good supersingular reduction at the elliptic curve corresponding to z, we show that there exists a cusp form f such that F|Upm f|Upm pκm, where κm=αm -β with α only depending on the weight of F and β depending on F and p but is independent of m. In particular, if the space of cusp forms is trivial, then F|Upm 0 pκm vanishes p-adically to a high order. In order to prove these results, we use the fact that p has supersingular reduction to realize F as an overconvergent modular form and then utilize the theory of overconvergent forms to show the congruences.