The second shifted difference of partitions and its applications

Abstract

A number of recent papers have estimated ratios of the partition function p(n-j)/p(n), which appears in many applications. Here, we prove an easy-to-use effective bound on these ratios. Using this, we then study second shifted difference of partitions, f(j,n):= p(n) -2p(n-j) +p(n-2j), and give another easy-to-use estimate of f(j,n). As applications of these, we prove a shifted convexity property of p(n), as well as giving new estimates of the k-rank partition function Nk(m,n) and non-k-ary partitions along with their differences.