Log-Concavity of Infinite Product Generating Functions
Abstract
In the 1970s Nicolas proved that the coefficients pd(n) defined by the generating function equation* Σn=0∞ pd(n) \, qn = Πn=1∞ ( 1- qn)-nd-1 equation* are log-concave for d=1. Recently, Ono, Pujahari, and Rolen have extended the result to d=2. Note that p1(n)=p(n) is the partition function and p2(n)=pp( n) is the number of plane partitions. In this paper, we invest in properties for pd(n) for general d. Let n ≥ 6. Then pd(n) is almost log-concave for n divisible by 3 and almost strictly log-convex otherwise.
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