Inequalities for the k-Regular Overpartitions

Abstract

Bessenrodt and Ono, Chen, Wang and Jia, DeSalvo and Pak were the first to discover the log-subadditivity, log-concavity, and the third-order Tur\'an inequality of partition function, respectively. Many other important partition statistics are proved to enjoy similar properties. This paper focuses on the partition function pk(n), which counts the number of overpartitions of n with no parts divisible by k. We provide a combinatorial proof to establish that for any k≥2, the partition function pk(n) exhibits strict log-subadditivity. Specifically, we show that pk(a)pk(b)>pk(a+b) for integers a≥ b≥1 and a+b≥ k. Furthermore, we investigate the log-concavity and the satisfaction of the third-order Tur\'an inequality for pk(n), where 2≤ k≤9.