Total Positivity of Almost-Riordan Arrays

Abstract

In this paper we study the total positivity of almost-Riordan arrays (d(t)|\, g(t), f(t)) and establish its necessary conditions and sufficient conditions, particularly, for some well used formal power series d(t). We present a semidirect product of an almost-array and use it to transfer a total positivity problem for an almost-Riordan array to the total positivity problem for a quasi-Riordan array. We find the sequence characterization of total positivity of the almost-Riordan arrays. The production matrix J of an almost-Riordan array (d|\, g,f) is presented so that J is totally positive implies the total positivity of both the almost-Riordan array (d|\, g,f) and the Riordan array (g,f). We also present a counterexample to illustrate that this sufficient condition is not necessary. If the production matrix J is tridiagonal, then the expressions of its principal minors are given. By using expressions, we find a sufficient and necessary condition of the total positivity of almost-Riordan arrays with tridiagonal production matrices. A numerous examples are given to demonstrate our results.