Paul Barry
Published 2017-02-13Version 1
Using the language of Riordan arrays, we study a one-parameter family of orthogonal polynomials that we call the restricted Chebyshev-Boubaker polynomials. We characterize these polynomials in terms of the three term recurrences that they satisfy, and we study certain central sequences defined by their coefficient arrays. We give an integral representation for their moments, and we show that the Hankel transforms of these moments have a simple form. We show that the (sequence) Hankel transform of the row sums of the corresponding moment matrix is defined by a family of polynomials closely related to the Chebyshev polynomials of the second kind, and that these row sums are in fact the moments of another family of orthogonal polynomials.
Comments: 17 pages. arXiv admin note: text overlap with arXiv:1606.05077
Notes on the Hankel transform of linear combinations of consecutive pairs of Catalan numbers
The Matrix Ansatz, Orthogonal Polynomials, and Permutations
Eulerian-Dowling Polynomials as Moments, Using Riordan Arrays
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