Higher Order Turan Inequalities for the Distinct Partition Function
Abstract
We prove that the number q(n) of partitions into distinct parts is log-concave for n ≥ 33 and satisfies the higher order Tur\'an inequalities for n≥ 121 conjectured by Craig and Pun. In doing so, we establish explicit error terms for q(n) and for q(n-1)q(n+1)/q(n)2 based on Chern's asymptotic formulas for η-quotients.
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