Ramanujan's partition generating functions modulo

Abstract

For the partition function p(n), Ramanujan proved the striking identities P5(q):=Σn≥ 0 p(5n+4)qn =5Πn≥ 1 (q5;q5)∞5(q;q)∞6, P7(q):=Σn≥ 0 p(7n+5)qn =7Πn≥ 1(q7;q7)∞3(q;q)∞4+49q Πn≥ 1(q7;q7)∞7(q;q)∞8, where (q;q)∞:=Πn≥ 1(1-qn). As these identities imply his celebrated congruences modulo 5 and 7, it is natural to seek, for primes ≥ 5, closed form expressions of the power series P(q):=Σn≥ 0 p( n-δ)qn, where δ:=2-124. In this paper, we prove that P(q) c T(q) (q; q )∞ , where c∈ Z is explicit and T(q) is the generating function for the Hecke traces of -ramified values of special Dirichlet series for weight -1 cusp forms on SL2(Z). This is a new proof of Ramanujan's congruences modulo 5, 7, and 11, as there are no nontrivial cusp forms of weight 4, 6, and 10.