On the number of even and odd strings along the over partitions of n

Abstract

Recently, Andrews, Chan, Kim and Osburn introduced the even strings and the odd strings in the overpartitions. We show that their conjecture Ak (n) ≥ Bk (n) holds for large enough positive integers n, where Ak(n) (resp. Bk(n)) is the number of odd (resp. even) strings along the overpartitions of n. We introduce m-strings and show that how this new combinatorial object is related with another positivity conjecture of Andrews, Chan, Kim, and Osburn. Finally, we confirm that the positivity conjecture is also true for large enough integers.