Log-Concavity of Infinite Product and Infinite Sum Generating Functions

Abstract

We expand on the remark by Andrews on the importance of infinite sums and products in combinatorics. Let \gd(n)\d≥ 0,n ≥ 1 be the double sequences σd(n)= Σ n d or d(n)= nd. We associate double sequences \ pgd ( n) \ and \ qgd ( n) \ , defined as the coefficients of eqnarray* Σn=0∞ pgd ( n) \, tn & := & Πn=1∞ ( 1 - tn )- Σ n μ() \, gd(n/) n , \\ Σn=0∞ qgd ( n) \, tn & := & 11 - Σn=1∞ gd(n) \, tn . eqnarray* These coefficients are related to the number of partitions p( n) = pσ 1 ( n) , plane partitions pp( n) = pσ 2 ( n) of n, and Fibonacci numbers F2n = q 1 ( n) . Let n ≥ 3 and let n 0 3. Then the coefficients are log-concave at n for almost all d in the exponential and geometric cases. The coefficients are not log-concave for almost all d in both cases, if n 2 3. Let n 1 3. Then the log-concave property flips for almost all d.