Congruences for Level 1 cusp forms of half-integral weight

Abstract

Suppose that ≥ 5 is prime. For a positive integer N with 4 N, previous works studied properties of half-integral weight modular forms on 0(N) which are supported on finitely many square classes modulo , in some cases proving that these forms are congruent to the image of a single variable theta series under some number of iterations of the Ramanujan -operator. Here, we study the analogous problem for modular forms of half-integral weight on SL2(Z). Let η be the Dedekind eta function. For a wide range of weights, we prove that every half-integral weight modular form on SL2(Z) which is supported on finitely many square classes modulo can be written modulo in terms of η and an iterated derivative of η.