On Type 2 Degenerate Poly-Frobenius-Euler Polynomials

Roberto  B. Corcino,; Cristina  B. Corcino,; Waseem  A. Khan,

On Type 2 Degenerate Poly-Frobenius-Euler Polynomials

Roberto B. Corcino | Cristina B Corcino | Waseem A. Khan

Abstract:

Background: This paper introduces a class of special polynomials called Type 2 degenerate poly-Frobenius-Euler polynomials, defined using the polyexponential function. Motivated by the expanding theory of degenerate versions of classical polynomials, the paper seeks to enrich the mathematical landscape by constructing generalized structures with deeper combinatorial and analytic properties. Methods: The study employs the method of generating functions combined with Cauchy's rule for the product of two series to derive explicit formulas and identities, enabling systematic manipulation of series expansions. From an analytic perspective, the authors utilized the comparison test and principles of uniform convergence to establish that certain integral representations correspond to holomorphic functions. Results: The researchers successfully derived explicit formulas and identities for the Type 2 degenerate poly-Frobenius-Euler polynomials. They established meaningful connections with the degenerate Stirling numbers of the first and second kinds. Furthermore, they introduced the Type 2 degenerate unipolypoly-Frobenius-Euler polynomials, defined via the unipoly function, and thoroughly investigated their various properties, including behaviors under differentiation and integration. Conclusion: The study significantly advances the theory of degenerate polynomials by constructing new polynomial families, derivation of explicit identities, and establishing analytic properties. It opens new avenues for future research by bridging classical and generalized combinatorial sequences within a robust analytic framework.

References:

Alam, N., Khan, W. A., K谋z谋late艧, C., Obeidat, S., Ryoo, C. S., & Diab, N. S. (2023). Some explicit properties of Frobenius–Euler–Genocchi polynomials with applications in computer modeling. Symmetry, 15(7), 1358–1358.
Araci, S., & Acikgoz, M. (2012). A note on the Frobenius-Euler numbers and polynomials associated with Bernstein polynomials. Advanced Studies in Contemporary Mathematics, 22(3). Arxiv.
Carlitz, L. (1956). A degenerate Staudt-Clausen theorem, Arch. Math. (Basel), 7, 28-33.
Carlitz, L. (1979). Degenerate Stirling, Bernoulli and Eulerian numbers. Utilitas Math, 15, 51–88.
Eastham, M. S. P. (1964). On polylogarithms. Proceedings of the Glasgow Mathematical Association, 6(4), 169–171.
Elizalde, S. L., & Patan, R. A. (2022). Deriving a formula in solving reverse Fibonacci means. Recoletos Multidisciplinary Research Journal, 10(2), 41–45.
Guan, H., Khan, W. A., & K谋z谋late艧, C. (2023). On generalized bivariate (p,q)-Bernoulli–Fibonacci polynomials and generalized bivariate (p,q)-Bernoulli–Lucas polynomials. Symmetry, 15(4), 943–943.
Janson, S. (2013). Euler-Frobenius numbers and rounding. Arxiv; Cornell University.
Kaneko, M. (2025). Poly-Bernoulli numbers. Journal de Théorie Des Nombres de Bordeaux, 9(1), 221–228.
Khan, W. A. (2018). A new class of degenerate Frobenius-Euler-Hermite polynomials. Advanced Studies in Contemporary Mathematics, 28(4), 567–576.
Khan, W. A. (2023). Construction of the type 2 degenerate poly-Euler polynomials and numbers. Matemati膷ki Vesnik, 75(3), 147–156.
Khan, W. A., Alatawi, M. S., & Duran, U. (2023). Applications and Properties for Bivariate Bell-Based Frobenius-Type Eulerian Polynomials. Journal of Function Spaces, 2023.
Khan, W. A., Duran, U., Younis, J., & Ryoo, C. S. (2023). On some extensions for degenerate Frobenius-Euler-Genocchi polynomials with applications in computer modeling. Applied Mathematics in Science and Engineering, 32(1).
Khan, W. A., & Kamarujjama, M. (2023). A note on type 2 poly-Bernoulli polynomials of the second kind. Palestine Journal of Mathematics, 12(3), 74–84.
Kim, D. S., & Kim, T. (2013). A note on higher-order Bernoulli polynomials. Journal of Inequalities and Applications, 2013.
Kim, D. S., & Kim, T. (2019). A note on polyexponential and unipoly functions. Russian Journal of Mathematical Physics, 26, 40–49.
Kim, T. (2017). A note on degenerate stirling polynomials of the second kind. Proceedings of the Jangjeon Mathematical Society, 20(3). Arxiv.
Kim, T., & Kim, D. S. (2018). An identity of symmetry for the degenerate Frobenius-Euler polynomials. Mathematica Slovaca, 68(1), 239–243.
Kim, T., & Kim, D. S. (2020). Degenerate polyexponential functions and degenerate Bell polynomials. Journal of Mathematical Analysis and Applications, 487(2), 124017–124017.
Kim, T., Kim, D. S., Kim, H. Y., & Jang, L.-C. (2020). Degenerate poly-Bernoulli numbers and polynomials. Informatica, 31(3).
Kim, T., Kwon, H.-I., & Seo, J.-J. (2015). On the degenerate Frobenius-Euler polynomials. Global Journal of Pure and Applied Mathematics, 11(5). Arxiv.
Kurt, B. (2017). Poly-Frobenius-Euler polynomials. AIP Conference Proceesings, 1863(1).
Kurt, B., & Simsek, Y. (2013). On the generalized Apostol-type Frobenius-Euler polynomials. Advances in Difference Equations, 2013(1).
Muhiuddin, G., Khan, W. A., & Al-Kadi, D. (2021). Construction on the degenerate Poly-Frobenius-Euler polynomials of complex variable. Journal of Function Spaces, 2021.
Muhiuddin, G., Khan, W. A., & Al-Kadi, D. (2022). Some identities of the degenerate poly-Cauchy and Unipoly Cauchy polynomials of the second kind. Computer Modeling in Engineering & Sciences, 132(3), 763–779.
Muhiuddin, G., Khan, W. A., & Younis, J. (2021). Construction of Type 2 Poly-Changhee Polynomials and Its Applications. Journal of Mathematics, 2021.
Rao, Y., Khan, W. A., Araci, S., & Ryoo, C. S. (2023). Explicit properties of Apostol-Type Frobenius–Euler polynomials involving q-Trigonometric functions with applications in computer modeling. Mathematics, 11(10), 2386.
Zhang, C., Khan, W. A., & K谋z谋late艧, C. (2023). On (p,q)–Fibonacci and (p,q)–Lucas polynomials associated with Changhee numbers and their properties. Symmetry, 15(4), 851–851.