Hankel transform of a sequence obtained by series reversion II - aerating transforms

Abstract

This paper provides the connection between the Hankel transform and aerating transforms of a given integer sequence. Results obtained are used to establish a completely different Hankel transform evaluation of the series reversion of a certain rational function Q(x) and shifted sequences, recently published in our paper part1. For that purpose, we needed to evaluate the Hankel transforms of the sequences α2 Cn-βCn+1 and α2 Cn+1-βCn+2, where C=Cn is the well-known sequence of Catalan numbers. This generalizes the results of Cvetkovi\' c, Rajković and Ivković CRI. Also, we need the evaluation of Hankel-like determinants whose entries are Catalan numbers Cn and which is based on the recent results of Krattenthaler krattCat. The results obtained are general and can be applied to many other Hankel transform evaluations.