On the parity of coefficients of eta powers

Abstract

We consider a special subsequence of the Fourier coefficients of powers of the Dedekind η-function, analogous to the sequence δ := 24-1 on which exceptional congruences of the partition function are supported. Therefrom we define a notion of density D(r) for a normalized eta-power ηr measuring the proportion of primes for which the order at infinity of U (ηr) modulo 2 is maximal. We relate D(r) to a notion of density measuring nonzero prime Fourier coefficients introduced by Bella\"iche, and use this to completely classify the vanishing of and establish upper bounds for D(r). Furthermore, for several infinite families of η powers corresponding to dihedral/CM mod-2 modular forms in the sense of Nicholas-Serre and Bella\"iche, we explicitly compute the densities D. We rely on Galois-theoretic techniques developed by Bella\"iche in level 1 and extend these to level 9. En passant we take the opportunity to communicate proofs of two of Bella\"iche's unpublished results on densities of mod-2 modular forms.

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