Congruences like Atkin's for the partition function

Abstract

Let p(n) be the ordinary partition function. In the 1960s Atkin found a number of examples of congruences of the form p( Q3 n+β)0 where and Q are prime and 5≤ ≤ 31; these lie in two natural families distinguished by the square class of 1-24β. In recent decades much work has been done to understand congruences of the form p(Qm n+β) 0. It is now known that there are many such congruences when m≥ 4, that such congruences are scarce (if they exist at all) when m=1, 2, and that for m=0 such congruences exist only when =5, 7, 11. For congruences like Atkin's (when m=3), more examples have been found for 5≤ ≤ 31 but little else seems to be known. Here we use the theory of modular Galois representations to prove that for every prime ≥ 5, there are infinitely many congruences like Atkin's in the first natural family which he discovered and that for at least 17/24 of the primes there are infinitely many congruences in the second family.

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