Congruences like Atkin's for generalized Frobenius partitions

Abstract

In the 1960s Atkin discovered congruences modulo primes ≤ 31 for the partition function p(n) in arithmetic progressions modulo Q3, where Q≠ is prime. Recent work of the first author with Allen and Tang shows that such congruences exist for all primes ≥ 5. Here we consider (for primes m≥ 5) the m-colored generalized Frobenius partition functions cφm(n); these are natural level m analogues of p(n). For each such m we prove that there are similar congruences for cφm(n) for all primes outside of an explicit finite set depending on m. To prove the result we first construct, using both theoretical and computational methods, cusp forms of half-integral weight on 0(m) which capture the relevant values of cφm(n) modulo~. We then apply previous work of the authors on the Shimura lift for modular forms with the eta multiplier together with tools from the theory of modular Galois representations.

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