Classification of congruences for mock theta functions and weakly holomorphic modular forms

Abstract

Let f(q) denote Ramanujan's mock theta function \[f(q) = Σn=0∞ a(n) qn := 1+Σn=1∞ qn2(1+q)2(1+q2)2·s(1+qn)2.\] It is known that there are many linear congruences for the coefficients of f(q) and other mock theta functions. We prove that if the linear congruence a(mn+t) 0 holds for some prime ≥ 5, then | m and (24t-1) ≠ (-1). We prove analogous results for the mock theta function ω(q) and for a large class of weakly holomorphic modular forms which includes η-quotients. This extends work of Radu in which he proves a conjecture of Ahlgren and Ono for the partition function p(n).