A positivity conjecture related first positive rank and crank moments for overpartitions

Abstract

Recently, Andrews, Chan, Kim and Osburn introduced a q-series h(q) for the study of the first positive rank and crank moments for overpartitions. They conjectured that for all integers m ≥ 3, equation*hqcon 1(q)∞ (h(q) - m h(qm)) equation* has positive power series coefficients for all powers of q. Byungchan Kim, Eunmi Kim and Jeehyeon Seo provided a combinatorial interpretation and proved it is asymptotically true by circle method. In this note, we show this conjecture is true if m is any positive power of 2, and we show that in order to prove this conjecture, it is only to prove it for all primes m. Moreover we give a stronger conjecture. Our method is very simple and completely different from that of Kim et al.