Sequences with Inequalities

Abstract

We consider infinite sequences of positive numbers. The connection between log-concavity and the Bessenrodt--Ono inequality had been in the focus of several papers. This has applications in the white noise distribution theory and combinatorics. We improve a recent result of Benfield and Roy and show that for the sequence of partition numbers \p(n)\ Nicolas' log-concavity result implies the result of Bessenrodt and Ono towards p(n) \, p(m) > p(n+m). We provide several examples. Benfield and Roy gave a conjecture related to -ary partition numbers. We prove part of this conjecture.