English

Higher Order Tur\'an Inequalities for the Partition Function

Combinatorics 2017-07-03 v1 Number Theory

Abstract

The Tur\'{a}n inequalities and the higher order Tur\'{a}n inequalities arise in the study of Maclaurin coefficients of an entire function in the Laguerre-P\'{o}lya class. A real sequence {an}\{a_{n}\} is said to satisfy the Tur\'{a}n inequalities if for n1n\geq 1, an2an1an+10a_n^2-a_{n-1}a_{n+1}\geq 0. It is said to satisfy the higher order Tur\'{a}n inequalities if for n1n\geq 1, 4(an2an1an+1)(an+12anan+2)(anan+1an1an+2)204(a_{n}^2-a_{n-1}a_{n+1})(a_{n+1}^2-a_{n}a_{n+2})-(a_{n}a_{n+1}-a_{n-1}a_{n+2})^2\geq 0. A sequence satisfying the Tur\'an inequalities is also called log-concave. For the partition function p(n)p(n), DeSalvo and Pak showed that for n>25n>25, the sequence {p(n)}n>25\{ p(n)\}_{n> 25} is log-concave, that is, p(n)2p(n1)p(n+1)>0p(n)^2-p(n-1)p(n+1)>0 for n>25n> 25. It was conjectured by Chen that p(n)p(n) satisfies the higher order Tur\'{a}n inequalities for n95n\geq 95. In this paper, we prove this conjecture by using the Hardy-Ramanujan-Rademacher formula to derive an upper bound and a lower bound for p(n+1)p(n1)/p(n)2p(n+1)p(n-1)/p(n)^2. Consequently, for n95n\geq 95, the Jensen polynomials g3,n1(x)=p(n1)+3p(n)x+3p(n+1)x2+p(n+2)x3g_{3,n-1}(x)=p(n-1)+3p(n)x+3p(n+1)x^2+p(n+2)x^3 have only real zeros. We conjecture that for any positive integer m4m\geq 4 there exists an integer N(m)N(m) such that for nN(m)n\geq N(m) , the polynomials k=0m(mk)p(n+k)xk\sum_{k=0}^m {m\choose k}p(n+k)x^k have only real zeros. This conjecture was independently posed by Ono.

Keywords

Cite

@article{arxiv.1706.10245,
  title  = {Higher Order Tur\'an Inequalities for the Partition Function},
  author = {William Y. C. Chen and Dennis X. Q. Jia and Larry X. W. Wang},
  journal= {arXiv preprint arXiv:1706.10245},
  year   = {2017}
}

Comments

23 pages

R2 v1 2026-06-22T20:34:41.783Z