A note on the Higher order Tur\'an inequalities for k-regular partitions

Abstract

Nicolas and DeSalvo and Pak proved that the partition function p(n) is log concave for n ≥ 25. Chen, Jia and Wang proved that p(n) satisfies the third order Tur\'an inequality, and that the associated degree 3 Jensen polynomials are hyperbolic for n ≥ 94. More recently, Griffin, Ono, Rolen and Zagier proved more generally that for all d, the degree d Jensen polynomials associated to p(n) are hyperbolic for sufficiently large n. In this paper, we prove that the same result holds for the k-regular partition function pk(n) for k ≥ 2. In particular, for any positive integers d and k, the order d Tur\'an inequalities hold for pk(n) for sufficiently large n. The case when d = k = 2 proves a conjecture by Neil Sloane that p2(n) is log concave.