2012
DOI: 10.1016/j.laa.2012.07.015
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Recurrence relations for the Sheffer sequences

Abstract: In this paper, using the production matrix of an exponential Riordan array [g(t), f (t)], we give a recurrence relation for the Sheffer sequence for the ordered pair (g(t), f (t)). We also develop a new determinant representation for the general term of the Sheffer sequence. As applications, determinant expressions for some classical Sheffer polynomial sequences are derived.

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Cited by 21 publications
(16 citation statements)
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“…This leads to the important corollary which is an analogue of [35] Corollary 9. If L = (g(x), f (x)) is a Riordan array and P = S L is (d + 2)-banded lower matrix given by (18), then L −1 is the coefficient array of the family of d-OPS.…”
Section: Stieltjes Matrixmentioning
confidence: 89%
See 2 more Smart Citations
“…This leads to the important corollary which is an analogue of [35] Corollary 9. If L = (g(x), f (x)) is a Riordan array and P = S L is (d + 2)-banded lower matrix given by (18), then L −1 is the coefficient array of the family of d-OPS.…”
Section: Stieltjes Matrixmentioning
confidence: 89%
“…In this case, the corresponding Stieltjes matrix takes the following form . Therefore, from (35) and (36) we obtain f (x) = b + xe τx and…”
Section: Sheffer Riordan Arraymentioning
confidence: 99%
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“…It should be noted that very recently, another Yang [24] established a different determinantal representation for Sheffer sequences by using an approach based on the production matrices of Riordan arrays. Now, let us introduce some definitions and results briefly.…”
Section: Introductionmentioning
confidence: 99%
“…In [9][10][11], there are two different algebraic approaches to Appell polynomials [12] that are a particular case of Sheffer polynomials. Recently, in [13] a determinantal form for Sheffer polynomials has been proposed. In this paper, we offer a new algebraic approach to Sheffer polynomial sequences, extending the one in [10] for Appell polynomials.…”
Section: Introductionmentioning
confidence: 99%