Infinitely Log-monotonic Combinatorial Sequences

Abstract: We introduce the notion of infinitely log-monotonic sequences. By establishing a connection between completely monotonic functions and infinitely log-monotonic sequences, we show that the sequences of the Bernoulli numbers, the Catalan numbers and the central binomial coefficients are infinitely log-monotonic. In particular, if a sequence ${a_n}{n\geq 0}$ is log-monotonic of order two, then it is ratio log-concave in the sense that the sequence ${a{n+1}/a_{n}}{n\geq 0}$ is log-concave. Furthermore, we prove that if a sequence ${a_n}{n\geq k}$ is ratio log-concave, then the sequence ${\sqrt[n]{a_n}}{n\geq k}$ is strictly log-concave subject to a certain initial condition. As consequences, we show that the sequences of the derangement numbers, the Motzkin numbers, the Fine numbers, the central Delannoy numbers, the numbers of tree-like polyhexes and the Domb numbers are ratio log-concave. For the case of the Domb numbers $D_n$, we confirm a conjecture of Sun on the log-concavity of the sequence ${\sqrt[n]{D_n}}{n\geq 1}$.