English

Inequalities for the Broken $k$-Diamond Partition Function

Number Theory 2022-09-16 v1 Combinatorics

Abstract

In 2007, Andrews and Paule introduced the broken kk-diamond partition function Δk(n)\Delta_k(n), which has received a lot of researches on the arithmetic propertises. In this paper, we prove that D3logΔ1(n1)>0D^3\log \Delta_1(n-1)>0 for n5n\geq 5 and D3logΔ2(n1)>0D^3 \log \Delta_2(n-1)>0 for n7n\geq 7, where DD is the difference operator with respect to nn. We also conjecture that for any k1k\geq 1 and r1r\geq 1, there exists a positive integer nk(r)n_k(r) such that for nnk(r)n\geq n_{k}(r), (1)rDrlogΔk(n)>0(-1)^r D^r \log \Delta_k(n)>0. This is analogous to the positivity of finite differences of the logarithm of the partition function, which has been proved by Chen, Wang and Xie. Furthermore, we obtain that both {Δ1(n)}n0\{\Delta_1(n)\}_{n\geq 0} and {Δ2(n)}n0\{\Delta_2(n)\}_{n\geq 0} satisfy the higher order Tur\'an inequalities for n6n \geq 6.

Cite

@article{arxiv.2209.07056,
  title  = {Inequalities for the Broken $k$-Diamond Partition Function},
  author = {Dennis X. Q. Jia},
  journal= {arXiv preprint arXiv:2209.07056},
  year   = {2022}
}
R2 v1 2026-06-28T01:20:13.355Z