Eisenstein series modulo prime powers

Abstract

If p≥ 5 is prime and k≥ 4 is an even integer with (p-1) k we consider the Eisenstein series Gk on SL2(Z) modulo powers of p. It is classically known that for such k we have Gk Gk' p if k k'p-1. Here we obtain a generalization modulo prime powers pm by giving an expression for Gkpm in terms of modular forms of weight at most mp. As an application we extend a recent result of the first author with Hanson, Raum and Richter by showing that, modulo powers of Ep-1, every such Eisenstein series is congruent modulo pm to a modular form of weight at most mp. We prove a similar result for the normalized Eisenstein series Ek in the case that (p-1) k and m<p.