Quadratic Congruences for half-integral weight cusp forms with the eta multiplier

Abstract

Let ≥ 5 be a prime, and let η denote the Dedekind eta multiplier. For an odd integer r, and a real Dirichlet character , recent work of Ahlgren, Andersen, and the author showed that quadratic congruences modulo hold for a wide range of half-integral weight cusp forms with multiplier ηr, vastly generalizing certain congruences discovered by Atkin for the partition function. In this paper, we show that such congruences hold when is an arbitrary character. Our methods rely on the theory of modular Galois representations. For primes ≥ 5, the core of our work is the study of modular Galois representations modulo attached to integer-weight eigenforms with arbitrary Nebentypus whose images are large in a precise sense. Our key new result is that, given a finite set of such representations and γ ∈ 2(), there exists σ ∈ (/(ζ)) whose images under the representations are in the conjugacy class of γ2.

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