References
- Steffensen JF. The poweroid, an extension of the mathematical notion of power. Acta Math. 1941;73:333–366.
- Dattoli G, Cesarano C, Sacchetti M. A note in the monomiality principle and generalized polynomials. J Math Anal Appl. 1997;227:98–111.
- Ben Cheikh Y. Some results on quasi-monomiality. Appl Math Comput. 2003;141:63–76.
- Ben Cheikh Y. On obtaining dual sequences via quasi-monomiality. Georgian Math J. 2002;9:413–422.
- Dattoli G, Torre A, Mazzacurati G. Quasi-monomials and isospectral problems. Il Nuvo Cimento B. 1997;112:133–138.
- Dattoli G, Torre A, Mazzacurati G. Monomiality and integrals involving Laguerre polynomials. Rend Mat Appl. 1998;18:565–574.
- Ben Cheikh Y, Chaggara H. Operational rules and a generalized Hermite polynomials. J Math Anal Appl. 2007;332:11–21.
- Dattoli G, Germano B, Ricci PE. Comments on monomiality, ordinary polynomials and associated bi-orthogonal functions. Appl Math Comput. 2004;154:219–227.
- Bin Saad MG. Associated Laguerre-Konhauser polynomials, quasi monomiality and operational identities. J Math Anal Appl. 2006;324:1438–1448.
- Dattoli G, Srivastava HM, Cesarano C. The Laguerre and Legendre polynomials from an operational point of view. Appl Math Comput. 2001;124:117–127.
- He MX, Ricci PE. Differential equation of Appell polynomials via the factorization method. J Comput Appl Math. 2002;139:231–237.
- Noschese S. A monomiality principle approach to the Gould-Hopper polynomials. Rend Istit Mat Univ Trieste. 2001;33:71–82.
- Ben Cheikh Y, Chaggara H. Connection coefficients between Boas-Buck polynomial sets. J Math Anal Appl. 2006;319:665–689.
- Srivastava HM, Ben Cheikh Y. Orthogonality of some polynomial sets via quasi-monomiality. Appl Math Comput. 2003;141:415–425.
- Ben Cheikh Y, Chaggara H. Linearization coefficients for Sheffer polynomial sets via lowering operators. Int J Math Math Sci. 2006;1–15.
- Chihara TS. An introduction to orthogonal polynomials. New York: Gordan and Breach; 1978.
- Andrews GE, Askey R, Roy R. Special functions. Cambridge: Cambridge University Press; 1999 (Encyclopedia of mathematics and its applications; Vol. 71).
- Rainville ED. Special functions. New York: Macmillan; 1960.
- Van Iseghem J. Vector orthogonal relations. Vector QD-algorithm. J Comput Appl Math. 1987;19:141–150.
- Maroni P. L'orthogonalité et les récurrences des polynômes d'ordre supèrieur à deux. Ann Fac Sci Toulouse Math. 1989;10:105–139.
- Van Iseghem J. Approximants de Padé vectoriels [dissertation]. Université des Sciences et Technique de Lille-Flandre-Artois; 1987.
- De Bruin MG. Simultaneous Padé approximation and orthogonality. In: Brezinski C, Draux A, Magnus AP, et al., editors. Polynômes Orthogonaux et Applications. Berlin, Heidelberg: Springer; 1985. p. 74–83. (Lecture notes in mathematics; Vol. 1171).
- Kaliaguine V. The operator moment problem, vector continued fractions and explicit form of the Favard theorem for vector orthogonal polynomials. J Comput Appl Math. 2010;65:181–193.
- Barrios Rolania D, Branquinho A. Complex high order Toda lattices. J Difference Equ Appl. 2009;15:197–213.
- Barrios Rolania D, Branquinho A, Foulquié Moreno A. On the full Kostant-Toda system and the discrete Korteweg-de Vries equations. J Math Anal Appl. 2013;401:811–820.
- Ben Cheikh Y, Zaghouani A. d-orthogonality via generating function. J Comput Appl Math. 2007;199:2–22.
- Ben Cheikh Y, Ben Romdhane N. On d-symmetric classical d-orthogonal polynomials. J Comput Appl Math. 2011;236:85–93.
- Boukhemis A. A study of a sequence of classical orthogonal polynomials of dimension 2. J Approx Theory. 1997;90:435–454.
- Saib A. On semi-classical d-orthogonal polynomials. Math Nachr. 2013;286:1863–1885.
- Ben Cheikh Y, Gaied M. Dunkl-Appell d-orthogonal polynomials. Integral Transforms Spec Funct. 2007;18:581–597.
- Douak K. The relation of the d-orthogonal polynomials to the Appell polynomials. J Comput Appl Math. 1996;70:279–295.
- Ben Cheikh Y, Ouni A. Some generalized hypergeometric d-orthogonal polynomial sets. J Math Anal Appl. 2008;343:464–478.
- Douak K. On 2-orthogonal polynomials of Laguerre type. Int J Math Math Sci. 1999;22:29–48.
- Varma S. Some new d-orthogonal polynomial sets of Sheffer type. Commun Fac Sci Univ Ank Ser A1 Math Stat. 2019;68:913–922.
- Boukhemis A, Maroni P. Une caractérisation des polynômes strictement 1/p orthogonaux de type Sheffer Étude du cas p=2.. J Approx Theory. 1988;54:67–91.
- Chaggara H, Mbarki R. On d-orthogonal polynomials of Sheffer type. J Difference Equ Appl. 2018;24:1808–1829.
- Blel M, Ben Cheikh Y. d-orthogonality of a generalization of both Laguerre and Hermite polynomials. Georgian Math J. 2020;27:183–190.
- Ben Cheikh Y, Douak K. A generalized hypergeometric d-orthogonal polynomial set. C R Acad Sci Paris. 2000;9:349–354.
- Ben Cheikh Y, Chaggara H. Connection problems via lowering operators. J Comput Appl Math. 2005;178:45–61.
- Allaway WR. Orthogonality preserving maps and the Laguerre functional. Proc Amer Math Soc. 1987;100:82–86.
- Marcellan F, Szafraniec FH. Operators preserving orthogonality of polynomials. Studia Math. 1996;120:205–218.
- Douak K, Maroni P. Une caractérisation des polynômes d-orthogonaux “classiques”. J Approx Theory. 1995;82:177–204.
- Ben Romdhane N. On the zeros of d-orthogonal Laguerre polynomials and their q-analogues. Proc Amer Math Soc. 2016;144:5241–5249.
- Ben Romdhane N, Abdelkader E. On the zeros of some d-orthogonal polynomials. Integral Transforms Spec Funct. 2022;1–17. DOI:10.1080/10652469.2022.2043298