Large Deviations for the d'Arcais Numbers

Abstract

The d'Arcais polynomials Pn(z) for n∈\0,1,…\ are defined as Σn=0∞ Pn(z) qn = (-z((q;q)∞)) where the q-Pochhammer symbol is (q;q)∞ = Πk=1∞ (1-qk) for |q|<1. Denoting the coefficients for n ∈ N by the formula Pn(z) = Σk=1n A(2,n,k) zk/n!, we prove that kn! A(2,n,kn)/n! satisfies a Bahadur-Rao type large deviation formula in the limit n ∞ with kn/n ∈ [0,1) as long as kn ∞. The large deviation rate function is the Legendre-Fenchel transform g*(-) where g() = f-1() for the function f : (0,∞) R given by f(y)= (-((e-y;e-y)∞)). We relate this fact to information about the abundancy index.