Computational formulas and identities for new classes of Hermite-based Milne-Thomson type polynomials: Analysis of generating functions with Euler's formula


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KILAR N., ŞİMŞEK Y.

MATHEMATICAL METHODS IN THE APPLIED SCIENCES, vol.44, no.8, pp.6731-6762, 2021 (SCI-Expanded) identifier identifier

  • Publication Type: Article / Article
  • Volume: 44 Issue: 8
  • Publication Date: 2021
  • Doi Number: 10.1002/mma.7220
  • Journal Name: MATHEMATICAL METHODS IN THE APPLIED SCIENCES
  • Journal Indexes: Science Citation Index Expanded (SCI-EXPANDED), Scopus, Academic Search Premier, Aerospace Database, Applied Science & Technology Source, Communication Abstracts, Compendex, INSPEC, MathSciNet, Metadex, zbMATH, Civil Engineering Abstracts
  • Page Numbers: pp.6731-6762
  • Keywords: Chebyshev polynomials, generating function, Hermite type polynomials, homogeneous harmonic polynomials, Milne-Thomson type polynomials, special functions
  • Akdeniz University Affiliated: Yes

Abstract

The aim of this paper is to construct generating functions for a new family of polynomials, which are called parametric Hermite-based Milne-Thomson type polynomials. Many properties of these polynomials with their generating functions are investigated. These generating functions give us generalization of some well-known generating functions for special polynomials such as Hermite type polynomials, Milne-Thomson type polynomials, and Apostol type polynomials. Using the Euler formula, functional equation method for generating function, and differential operator technique, we give relations among parametric Hermite-based Milne-Thomson type polynomials, the Bernoulli numbers, the Euler numbers, the Chebyshev polynomials, the Bernstein basis functions, homogeneous harmonic polynomials, and parametric kinds of Apostol type polynomials. Moreover, some computational formulas for these polynomials are derived. Finally, using Wolfram Mathematica version 12.0, some of these polynomials and their generating functions are illustrated by their plots under the special conditions. Potential relationships and connections of this paper's results with the results of previous and future research are pointed out.