Congruence properties modulo prime powers for a class of partition functions

Abstract

Let p be prime, and let p[1,p](n) denote the function whose generating function is Π (1-qn)-1(1 - qpn)-1. This function and its generalizations p[c, dm](n) are the subject of study in several recent papers. Let ≥ 5, let j≥ 1, and let p ∈ \2, 3, 5\. In this paper, we prove that the generating function for p[1, p](n) in the progression βp, , j modulo j with 24βp, , j p + 1 j lies in a Hecke-invariant subspace of type \η(Dz)η(Dpz)F(Dz) : F(z) ∈ Ms(0(p), )\ for suitable D≥ 1, s≥ 0, and character~. When p∈ \2, 3, 5\, we use the Hecke-invariance of these subspaces proved in [21] to prove, for distinct primes and m≥ 5 and j≥ 1, congruences of the form \[ p[1, p](jmk n + 1D) 0 j \] for all n≥ 1 with m n, where k is explicitly computable and depends on the forms in the invariant subspace. Our proofs require adapting and extending analogous level one results on p(n) in [1] and [22] to level p.