On the Central Description of the Group of Riordan Arrays

Abstract

We provide an alternative description of the group of Riordan arrays, by using two power series of the form Σn=0∞ gn xn, where g0 0 to build a typical element of the constructed group. We relate these elements to Riordan arrays in the usual description, showing that each newly constructed element is the vertical half of a "usual" element. The product rules and the construction of the inverse are given in this new description, which we call a "central" description, because of links to the central coefficients of Riordan arrays. This is done for the case of ordinary generating functions. Finally, we briefly look at the exponential case.