Large Deviations for the d'Arcais Numbers

Abstract: The d'Arcais polynomials $P_n(z)$ for $n\in{0,1,\dots}$ are defined as $\sum_{n=0}^{\infty} P_n(z) q^n = \exp(-z\ln((q;q){\infty}))$ where the $q$-Pochhammer symbol is $(q;q){\infty} = \prod_{k=1}^{\infty} (1-q^k)$ for $|q|<1$. Denoting the coefficients for $n \in \mathbb{N}$ by the formula $P_n(z) = \sum_{k=1}^{n} A(2,n,k) z^k/n!$, we prove that $k_n! A(2,n,k_n)/n!$ satisfies a Bahadur-Rao type large deviation formula in the limit $n \to \infty$ with $k_n/n \to κ\in [0,1)$ as long as $k_n \to \infty$. The large deviation rate function is the Legendre-Fenchel transform $g^*(-κ)$ where $g(κ) = f^{-1}(κ)$ for the function $f : (0,\infty) \to \mathbb{R}$ given by $f(y)= \ln(-\ln((e^{-y};e^{-y})_{\infty}))$. We relate this fact to information about the abundancy index.