Parity of the coefficients of certain eta-quotients, II: The case of even-regular partitions

Abstract

We continue our study of the density of the odd values of eta-quotients, here focusing on the m-regular partition functions bm for m even. Based on extensive computational evidence, we propose an elegant conjecture which, in particular, completely classifies such densities: Let m = 2j m0 with m0 odd. If 2j < m0, then the odd density of bm is 1/2; moreover, such density is equal to 1/2 on every (nonconstant) subprogression An+B. If 2j > m0, then bm, which is already known to have density zero, is identically even on infinitely many non-nested subprogressions. This and all other conjectures of this paper are consistent with our ''master conjecture'' on eta-quotients presented in the previous work. In general, our results on bm for m even determine behaviors considerably different from the case of m odd. Also interesting, it frequently happens that on subprogressions An+B, bm matches the parity of the multipartition functions pt, for certain values of t. We make a suitable use of Ramanujan-Kolberg identities to deduce a large class of such results; as an example, b28(49n+12) p3(7n+2) 2. Additional consequences are several ''almost always congruences'' for various bm, as well as new parity results specifically for b11. We wrap up our work with a much simpler proof of the main result of a recent paper by Cherubini-Mercuri, which fully characterized the parity of b8.