Exploring the properties of multivariable Hermite polynomials in relation to Apostol-type Frobenius–Genocchi polynomials

Shahid Ahmad Wani; Tafaz Ul Rahman Shah; William Ramírez; Clemente Cesarano

doi:10.1515/gmj-2024-2071

Article

Exploring the properties of multivariable Hermite polynomials in relation to Apostol-type Frobenius–Genocchi polynomials

Shahid Ahmad Wani , Tafaz Ul Rahman Shah , William Ramírez and Clemente Cesarano

Published/Copyright: November 14, 2024

Published by

Become an author with De Gruyter Brill

Author Information Explore this Subject

From the journal Georgian Mathematical Journal Volume 32 Issue 3

Abstract

This work presents a general framework that innovates and explores different mathematical aspects associated with special functions by utilizing the mathematical physics-based idea of monomiality. This study presents a unique family of multivariable Hermite polynomials that are closely related to Frobenius–Genocchi polynomials of Apostol type. The study’s deductions address the differential equation, generating expression, operational formalism, and other characteristics that define these polynomials. The affirmation of the controlling monomiality principle further confirms their mathematical foundations. In addition, the work proves recurrence relations, fractional operators, summation formulae, series representations, operational and symmetric identities, and so on, all of which contribute to our knowledge of these complex polynomials.

Keywords: Monomiality principle; explicit form; operational connection; symmetric identities; summation formulae; multivariable special polynomials

MSC 2020: 33E20; 33C45; 33B10; 33E30; 39A14; 45J05; 11T23

References

[1] M. Ali Özarslan, Unified Apostol–Bernoulli, Euler and Genocchi polynomials, Comput. Math. Appl. 62 (2011), no. 6, 2452–2462. 10.1016/j.camwa.2011.07.031Search in Google Scholar

[2] R. Alyusof and S. A. Wani, Certain properties and applications of Δ h hybrid special polynomials associated with Appell sequences, Fractal Fract. 7 (2023), no. 3, Paper No. 233. 10.3390/fractalfract7030233Search in Google Scholar

[3] L. C. Andrews, Special Functions for Engineers and Applied Mathematicians, Macmillan, New York, 1985. Search in Google Scholar

[4] P. Appell and J. Kampé de Fériet, Fonctions hypergéométriques et hypersphériques: polynômes d’Hermite, Gauthier-Villars, Paris, 1926. Search in Google Scholar

[5] A. Bayad and T. Kim, Identities for Apostol-type Frobenius–Euler polynomials resulting from the study of a nonlinear operator, Russ. J. Math. Phys. 23 (2016), no. 2, 164–171. 10.1134/S1061920816020023Search in Google Scholar

[6] G. Dattoli, Generalized polynomials, operational identities and their applications, J. Comput. Appl. Math. 118 (2000), no. 1–2, 111–123. 10.1016/S0377-0427(00)00283-1Search in Google Scholar

[7] G. Dattoli, Hermite–Bessel and Laguerre–Bessel functions: A by-product of the monomiality principle, Advanced Special Functions and Applications (Melfi 1999), Proc. Melfi Sch. Adv. Top. Math. Phys. 1, Aracne, Rome (2000), 147–164. Search in Google Scholar

[8] G. Dattoli, Summation formulae of special functions and multivariable Hermite polynomials, Nuovo Cimento Soc. Ital. Fis. B 119 (2004), no. 5, 479–488. Search in Google Scholar

[9] G. Dattoli, S. Lorenzutta and C. Cesarano, Bernstein polynomials and operational methods, J. Comput. Anal. Appl. 8 (2006), no. 4, 369–377. Search in Google Scholar

[10] A. Erdélyi, W. Magnus, F. Oberhettinger and F. G. Tricomi, Higher Transcendental Functions. Vol. III, McGraw-Hill, New York, 1955. Search in Google Scholar

[11] D. S. Kim and T. Kim, Some new identities of Frobenius–Euler numbers and polynomials, J. Inequal. Appl. 2012 (2012), Paper No. 307. 10.1186/1029-242X-2012-307Search in Google Scholar

[12] T. Kim, An identity of the symmetry for the Frobenius–Euler polynomials associated with the fermionic p-adic invariant q-integrals on 𝐙 p , Rocky Mountain J. Math. 41 (2011), no. 1, 239–247. 10.1216/RMJ-2011-41-1-239Search in Google Scholar

[13] T. Kim, Identities involving Frobenius–Euler polynomials arising from non-linear differential equations, J. Number Theory 132 (2012), no. 12, 2854–2865. 10.1016/j.jnt.2012.05.033Search in Google Scholar

[14] T. Kim and B. Lee, Some identities of the Frobenius–Euler polynomials, Abstr. Appl. Anal. 2009 (2009), Article ID 639439. 10.1155/2009/639439Search in Google Scholar

[15] T. Kim, B. Lee, S.-H. Lee and S.-H. Rim, Some identities for the Frobenius–Euler numbers and polynomials, J. Comput. Anal. Appl. 15 (2013), no. 3, 544–551. Search in Google Scholar

[16] T. Kim and J. J. Seo, Some identities involving Frobenius–Euler polynomials and numbers, Proc. Jangjeon Math. Soc. 19 (2016), no. 1, 39–46. Search in Google Scholar

[17] B. Kurt and Y. Simsek, Frobenius–Euler type polynomials related to Hermite–Bernoulli polynomials, AIP Conf. Proc. 1389 (2011), 385–388. 10.1063/1.3636743Search in Google Scholar

[18] V. Kurt, Some symmetry identities for the Apostol-type polynomials related to multiple alternating sums, Adv. Difference Equ. 2013 (2013), Paper No. 32. 10.1186/1687-1847-2013-32Search in Google Scholar

[19] Q.-M. Luo, Apostol–Euler polynomials of higher order and Gaussian hypergeometric functions, Taiwanese J. Math. 10 (2006), no. 4, 917–925. 10.11650/twjm/1500403883Search in Google Scholar

[20] T. Nahid and J. Choi, Certain hybrid matrix polynomials related to the Laguerre–Sheffer family, Fractal Fract. 6 (2022), no. 4, Paper No. 211. 10.3390/fractalfract6040211Search in Google Scholar

[21] A. M. Obad, A. Khan, K. S. Nisar and A. Morsy, q-Binomial convolution and transformations of q-Appell polynomials, Axioms 10 (2021), Paper No. 70. 10.3390/axioms10020070Search in Google Scholar

[22] W. Ramírez and C. Cesarano, Some new classes of degenerated generalized Apostol–Bernoulli, Apostol–Euler and Apostol–Genocchi polynomials, Carpathian Math. Publ. 14 (2022), no. 2, 354–363. 10.15330/cmp.14.2.354-363Search in Google Scholar

[23] W. Ramírez, C. Cesarano and S. Díaz, New results for degenerated generalized Apostol–Bernoulli, Apostol–Euler and Apostol–Genocchi polynomials, WSEAS Trans. Math. 21 (2022), 604–608. 10.37394/23206.2022.21.69Search in Google Scholar

[24] Y. Simsek, Generating functions for q-Apostol type Frobenius–Euler numbers and polynomials, Axioms 1 (2012), no. 3, 395–403. 10.3390/axioms1030395Search in Google Scholar

[25] H. M. Srivastava, G. Yasmin, A. Muhyi and S. Araci, Certain results for the twice-iterated 2D q-Appell polynomials, Symmetry 11 (2019), no. 10, Paper No. 1307. 10.3390/sym11101307Search in Google Scholar

[26] J. F. Steffensen, The poweroid, an extension of the mathematical notion of power, Acta Math. 73 (1941), 333–366. 10.1007/BF02392231Search in Google Scholar

[27] S. A. Wani, K. Abuasbeh, G. I. Oros and S. Trabelsi, Studies on special polynomials involving degenerate Appell polynomials and fractional derivative, Symmetry 15 (2023), no. 4, Paper No. 840. 10.3390/sym15040840Search in Google Scholar

[28] S.-L. Yang, An identity of symmetry for the Bernoulli polynomials, Discrete Math. 308 (2008), no. 4, 550–554. 10.1016/j.disc.2007.03.030Search in Google Scholar

[29] Z. Zhang and H. Yang, Several identities for the generalized Apostol–Bernoulli polynomials, Comput. Math. Appl. 56 (2008), no. 12, 2993–2999. 10.1016/j.camwa.2008.07.038Search in Google Scholar

Received: 2024-03-22

Revised: 2024-04-23

Accepted: 2024-06-12

Published Online: 2024-11-14

Published in Print: 2025-06-01

You are currently not able to access this content.

Articles in the same Issue

https://doi.org/10.1515/gmj-2024-2071

Keywords for this article

Monomiality principle; explicit form; operational connection; symmetric identities; summation formulae; multivariable special polynomials