Research Article
Year 2022,
Volume: 10 Issue: 3, 125 - 134, 09.09.2022
Abstract
References
- [1] Carlitz, L.: Degenerate Stirling, Bernoulli and Eulerian numbers. Utilitas Mathematica. 15, 51-88 (1975).
- [2] Cheon,G.-S.: A note on the Bernoulli and Euler polynomials. Applied Mathematics Letters. 16, 365-368 (2003).
- [3] Dattoli, G., Ceserano, C., Sacchetti, D.: A note on truncated polynomials. Applied Mathematics and Computation. 134, 595-605 (2003).
- [4] Duran,U,Acikgoz,M.:GeneralizedGould-HopperbasedfullydegeneratecentralBellpolynomials.TurkishJournalof Analysis and Number Theory. 7 (5), 124-134 (2019).
- [5] Duran, U., Araci, S., Acikgoz, M.: Bell-Based Bernoulli polynomials with applications. Axioms. 10, no. 29 (2021).
- [6] Duran, U., Sadjang, P.N.: On Gould-Hopper-based fully degenerate poly-Bernoulli polynomials with a q-parameter. Mathematics. 7, no. 121 (2019).
- [7] Duran, U., Acikgoz, M.: On generalized degenerate Gould-Hopper based fully degenerate Bell polynomials. Journal of Mathematics and Computer Science. 21 (3), 243-257 (2020).
- [8] Duran, U., Acikgoz, M.: On Degenerate Truncated Special Polynomials. Mathematics. 8 (1), no. 144 (2020).
- [9] Hassen, A., Nguyen, H.D.: Hypergeometric Bernoulli polynomials and Appell sequences. International Journal of Number Theory. 4, 767-774 (2008).
- [10] Howard, F.T.: Explicit formulas for degenerate Bernoulli numbers. Discrete Mathematics. 162, 175-185 (1996).
- [11] Kim, T., Kim, D.S., Jang, L.-C., Kwon, H.I.: Extended degenerate stirling numbers of the second kind and extended degenerate Bell polynomials. Utilitas Mathematica. 106, 11-21 (2018).
- [12] Kim, T., Yao, Y., Kim, D.S., Jang, G.-W.: Degenerate r-Stirling numbers and r-Bell polynomials. Russian Journal of Mathematical Physics. 25, 44-58 (2018).
- [13] Kim, T.: A note on degenerate Stirling polynomials of the second kind. Proceedings of the Jangjeon Mathematical Society. 20, 319-331 (2017).
- [14] Kurt, B: Explicit relations for the modified degenerate Apostol-type polynomials. Journal of Balikesir University Institute of Science and Technology. 20, 401-412 (2018).
- [15] Pathan, M.A., Khan, W.A.: Some implicit summation formulas and symmetric identities for the generalized Hermite- Bernoulli polynomials. Mediterranean Journal of Mathematics. 12, 679-695 (2015).
- [16] Srivastava, H.M., Araci, S., Khan, W.A., Acikgoz, M.: A note on the truncated-exponential based Apostol-type polynomials. Symmetry. 11, no. 538 (2019).
- [17] Srivastava, H.M., Choi, J.: Zeta and q-Zeta functions and associated series and integrals. Elsevier Science Publishers. Amsterdam (2012).
- [18] Srivastava, H.M., Pinter, A.: Remarks on some relationships between the Bernoulli and Euler polynomials. Applied Mathematics Letters. 17, 375-380 (2004).
Year 2022,
Volume: 10 Issue: 3, 125 - 134, 09.09.2022
Abstract
In this study, we consider the truncated degenerate Bernoulli polynomials based on the Gould-Hopper polynomials and examine diverse properties and
formulas covering addition formulas, correlations and derivation property. Then, we derive some interesting implicit summation formulas and symmetric
identities. Moreover, we define Gould-Hopper based truncated degenerate Bernoulli polynomials of order rr and give some of their properties and
relations.
formulas covering addition formulas, correlations and derivation property. Then, we derive some interesting implicit summation formulas and symmetric
identities. Moreover, we define Gould-Hopper based truncated degenerate Bernoulli polynomials of order rr and give some of their properties and
relations.
Keywords
Degenerate exponential function truncated exponential function Bernoulli polynomials Gould-Hopper polynomials exponential generating function
References
- [1] Carlitz, L.: Degenerate Stirling, Bernoulli and Eulerian numbers. Utilitas Mathematica. 15, 51-88 (1975).
- [2] Cheon,G.-S.: A note on the Bernoulli and Euler polynomials. Applied Mathematics Letters. 16, 365-368 (2003).
- [3] Dattoli, G., Ceserano, C., Sacchetti, D.: A note on truncated polynomials. Applied Mathematics and Computation. 134, 595-605 (2003).
- [4] Duran,U,Acikgoz,M.:GeneralizedGould-HopperbasedfullydegeneratecentralBellpolynomials.TurkishJournalof Analysis and Number Theory. 7 (5), 124-134 (2019).
- [5] Duran, U., Araci, S., Acikgoz, M.: Bell-Based Bernoulli polynomials with applications. Axioms. 10, no. 29 (2021).
- [6] Duran, U., Sadjang, P.N.: On Gould-Hopper-based fully degenerate poly-Bernoulli polynomials with a q-parameter. Mathematics. 7, no. 121 (2019).
- [7] Duran, U., Acikgoz, M.: On generalized degenerate Gould-Hopper based fully degenerate Bell polynomials. Journal of Mathematics and Computer Science. 21 (3), 243-257 (2020).
- [8] Duran, U., Acikgoz, M.: On Degenerate Truncated Special Polynomials. Mathematics. 8 (1), no. 144 (2020).
- [9] Hassen, A., Nguyen, H.D.: Hypergeometric Bernoulli polynomials and Appell sequences. International Journal of Number Theory. 4, 767-774 (2008).
- [10] Howard, F.T.: Explicit formulas for degenerate Bernoulli numbers. Discrete Mathematics. 162, 175-185 (1996).
- [11] Kim, T., Kim, D.S., Jang, L.-C., Kwon, H.I.: Extended degenerate stirling numbers of the second kind and extended degenerate Bell polynomials. Utilitas Mathematica. 106, 11-21 (2018).
- [12] Kim, T., Yao, Y., Kim, D.S., Jang, G.-W.: Degenerate r-Stirling numbers and r-Bell polynomials. Russian Journal of Mathematical Physics. 25, 44-58 (2018).
- [13] Kim, T.: A note on degenerate Stirling polynomials of the second kind. Proceedings of the Jangjeon Mathematical Society. 20, 319-331 (2017).
- [14] Kurt, B: Explicit relations for the modified degenerate Apostol-type polynomials. Journal of Balikesir University Institute of Science and Technology. 20, 401-412 (2018).
- [15] Pathan, M.A., Khan, W.A.: Some implicit summation formulas and symmetric identities for the generalized Hermite- Bernoulli polynomials. Mediterranean Journal of Mathematics. 12, 679-695 (2015).
- [16] Srivastava, H.M., Araci, S., Khan, W.A., Acikgoz, M.: A note on the truncated-exponential based Apostol-type polynomials. Symmetry. 11, no. 538 (2019).
- [17] Srivastava, H.M., Choi, J.: Zeta and q-Zeta functions and associated series and integrals. Elsevier Science Publishers. Amsterdam (2012).
- [18] Srivastava, H.M., Pinter, A.: Remarks on some relationships between the Bernoulli and Euler polynomials. Applied Mathematics Letters. 17, 375-380 (2004).
There are 18 citations in total.
Details
| Primary Language | English |
|---|---|
| Subjects | Mathematical Sciences |
| Journal Section | Articles |
| Authors | |
| Publication Date | September 9, 2022 |
| Submission Date | March 9, 2021 |
| Acceptance Date | July 6, 2021 |
| Published in Issue | Year 2022 Volume: 10 Issue: 3 |
Cite
The published articles in MSAEN are licensed under a Creative Commons Attribution-NonCommercial 4.0 International License.