GENERALIZED IDENTITIES OF BIVARIATE FIBONACCI AND BIVARIATE LUCAS POLYNOMIALS

Yashwant Panwar; V. K. Gupta; Jaya Bhandari

Research Article

GENERALIZED IDENTITIES OF BIVARIATE FIBONACCI AND BIVARIATE LUCAS POLYNOMIALS

Year 2020, Volume: 1 Issue: 2, 142 - 150, 31.12.2020

Yashwant Panwar V. K. Gupta Jaya Bhandari

Abstract

In this paper, we present generalized identities of bivariate Fibonacci polynomials and bivariate Lucas polynomials and related identities consisting even and odd terms. Binet’s formula will employ to obtain the identities. Also we describe and derive sums and connection formulae.

Keywords

Bivariate Fibonacci polynomials, Bivariate Lucas polynomials, Binet's formula

References

Altıntaş, İ., & Taşköprü, K., (2019). Unoriented knot polynomials of torus links as Fibonacci-type polynomials. Asian-European Journal of Mathematics, 12(4). https://doi.org/10.1142/S1793557119500530
Alves, F.R.V., & Catarino, P.M.M.C., (2016). The Bivariate (Complex) Fibonacci and Lucas Polynomials: An Historical Investigation with the Maple's Help. Acta Didactica Napocensia, 9(4), 71-95.
Belbachir, H., & Bencherif, F. (2007). On some properties on bivariate Fibonacci and Lucas polynomials. arXiv:0710.1451v1
Cakmak, T., & Karaduman, E., (2018). On the derivatives of bivariate Fibonacci polynomials. Notes On Number Theory and Discrete Mathematics, 24(3), 37-46.
Catalani, M., (2004 ‘a’). Some Formulae for Bivariate Fibonacci and Lucas Polynomials. http://front.math.ucdavis.edu/math.CO/0406323
Catalani, M., (2004 ‘b’). Identities for Fibonacci and Lucas Polynomials derived from a book of Gould. http://front.math.ucdavis.edu/math.CO/0407105
Catalani, M., (2004 ‘c’). Generalized Bivariate Fibonacci Polynomials. Version 2, http://front.math.ucdavis.edu/math.CO/0211366
Falcon, S., (2012). On k-Lucas numbers of arithmetic indexes. Applied Mathematics, 3, 1202-1206. http://dx.doi.org/10.4236/am.2012.310175
Falcon, S., & Plaza, A., (2009). On k-Fibonacci numbers of arithmetic indexes. Applied Mathematics and Computation, 208, 180–185. doi:10.1016/j.amc.2008.11.031
Inoue, K., & Aki, S., (2011). Bivariate Fibonacci polynomials of order k with statistical applications. Annals of the Institute of Statistical Mathematics, 63(1), 197-210.
Jacob, G., Reutenauer, C., & Sakarovitch, J. (2006). On a divisibility property of Fibonacci polynomials. http://perso.telecom-paristech.fr/~jsaka/PUB/Files/DPFP.pdf
Kaygisiz, K., & Sahin, A., (2011). Determinantal and permanental representation of generalized Bivariate Fibonacci p-polynomials. arXiv:1111.4071v1
Panwar, Y. K., & Singh, M., (2014). Generalized bivariate Fibonacci-Like polynomials. International journal of Pure Mathematics, 1, 8-13.
Tasci, D., Firengiz, M.C., & Tuglu, N. (2012). Incomplete Bivariate Fibonacci and Lucas 𝑝 –Polynomials. Discrete Dynamics in Nature and Society, vol. 2012, Article ID 840345, 2012. doi:10.1155/2012/840345.
Taşköprü, K., & Altıntaş, İ., (2015). HOMFLY polynomials of torus links as generalized Fibonacci polynomials. The electronic journal of combinatorics, 22(4), #P4.8

Year 2020, Volume: 1 Issue: 2, 142 - 150, 31.12.2020

Yashwant Panwar V. K. Gupta Jaya Bhandari

Abstract

References

Altıntaş, İ., & Taşköprü, K., (2019). Unoriented knot polynomials of torus links as Fibonacci-type polynomials. Asian-European Journal of Mathematics, 12(4). https://doi.org/10.1142/S1793557119500530
Alves, F.R.V., & Catarino, P.M.M.C., (2016). The Bivariate (Complex) Fibonacci and Lucas Polynomials: An Historical Investigation with the Maple's Help. Acta Didactica Napocensia, 9(4), 71-95.
Belbachir, H., & Bencherif, F. (2007). On some properties on bivariate Fibonacci and Lucas polynomials. arXiv:0710.1451v1
Cakmak, T., & Karaduman, E., (2018). On the derivatives of bivariate Fibonacci polynomials. Notes On Number Theory and Discrete Mathematics, 24(3), 37-46.
Catalani, M., (2004 ‘a’). Some Formulae for Bivariate Fibonacci and Lucas Polynomials. http://front.math.ucdavis.edu/math.CO/0406323
Catalani, M., (2004 ‘b’). Identities for Fibonacci and Lucas Polynomials derived from a book of Gould. http://front.math.ucdavis.edu/math.CO/0407105
Catalani, M., (2004 ‘c’). Generalized Bivariate Fibonacci Polynomials. Version 2, http://front.math.ucdavis.edu/math.CO/0211366
Falcon, S., (2012). On k-Lucas numbers of arithmetic indexes. Applied Mathematics, 3, 1202-1206. http://dx.doi.org/10.4236/am.2012.310175
Falcon, S., & Plaza, A., (2009). On k-Fibonacci numbers of arithmetic indexes. Applied Mathematics and Computation, 208, 180–185. doi:10.1016/j.amc.2008.11.031
Inoue, K., & Aki, S., (2011). Bivariate Fibonacci polynomials of order k with statistical applications. Annals of the Institute of Statistical Mathematics, 63(1), 197-210.
Jacob, G., Reutenauer, C., & Sakarovitch, J. (2006). On a divisibility property of Fibonacci polynomials. http://perso.telecom-paristech.fr/~jsaka/PUB/Files/DPFP.pdf
Kaygisiz, K., & Sahin, A., (2011). Determinantal and permanental representation of generalized Bivariate Fibonacci p-polynomials. arXiv:1111.4071v1
Panwar, Y. K., & Singh, M., (2014). Generalized bivariate Fibonacci-Like polynomials. International journal of Pure Mathematics, 1, 8-13.
Tasci, D., Firengiz, M.C., & Tuglu, N. (2012). Incomplete Bivariate Fibonacci and Lucas 𝑝 –Polynomials. Discrete Dynamics in Nature and Society, vol. 2012, Article ID 840345, 2012. doi:10.1155/2012/840345.
Taşköprü, K., & Altıntaş, İ., (2015). HOMFLY polynomials of torus links as generalized Fibonacci polynomials. The electronic journal of combinatorics, 22(4), #P4.8

There are 15 citations in total.

Details

Primary Language	English
Subjects	Engineering
Journal Section	Research & Review Articles
Authors	Yashwant Panwar V. K. Gupta This is me Jaya Bhandari This is me
Publication Date	December 31, 2020
Published in Issue	Year 2020 Volume: 1 Issue: 2

Cite

APA	Panwar, Y., Gupta, V. K., & Bhandari, J. (2020). GENERALIZED IDENTITIES OF BIVARIATE FIBONACCI AND BIVARIATE LUCAS POLYNOMIALS. Journal of Amasya University the Institute of Sciences and Technology, 1(2), 142-150.
AMA	Panwar Y, Gupta VK, Bhandari J. GENERALIZED IDENTITIES OF BIVARIATE FIBONACCI AND BIVARIATE LUCAS POLYNOMIALS. J. Amasya Univ. Inst. Sci. Technol. December 2020;1(2):142-150.
Chicago	Panwar, Yashwant, V. K. Gupta, and Jaya Bhandari. “GENERALIZED IDENTITIES OF BIVARIATE FIBONACCI AND BIVARIATE LUCAS POLYNOMIALS”. Journal of Amasya University the Institute of Sciences and Technology 1, no. 2 (December 2020): 142-50.
EndNote	Panwar Y, Gupta VK, Bhandari J (December 1, 2020) GENERALIZED IDENTITIES OF BIVARIATE FIBONACCI AND BIVARIATE LUCAS POLYNOMIALS. Journal of Amasya University the Institute of Sciences and Technology 1 2 142–150.
IEEE	Y. Panwar, V. K. Gupta, and J. Bhandari, “GENERALIZED IDENTITIES OF BIVARIATE FIBONACCI AND BIVARIATE LUCAS POLYNOMIALS”, J. Amasya Univ. Inst. Sci. Technol., vol. 1, no. 2, pp. 142–150, 2020.
ISNAD	Panwar, Yashwant et al. “GENERALIZED IDENTITIES OF BIVARIATE FIBONACCI AND BIVARIATE LUCAS POLYNOMIALS”. Journal of Amasya University the Institute of Sciences and Technology 1/2 (December 2020), 142-150.
JAMA	Panwar Y, Gupta VK, Bhandari J. GENERALIZED IDENTITIES OF BIVARIATE FIBONACCI AND BIVARIATE LUCAS POLYNOMIALS. J. Amasya Univ. Inst. Sci. Technol. 2020;1:142–150.
MLA	Panwar, Yashwant et al. “GENERALIZED IDENTITIES OF BIVARIATE FIBONACCI AND BIVARIATE LUCAS POLYNOMIALS”. Journal of Amasya University the Institute of Sciences and Technology, vol. 1, no. 2, 2020, pp. 142-50.
Vancouver	Panwar Y, Gupta VK, Bhandari J. GENERALIZED IDENTITIES OF BIVARIATE FIBONACCI AND BIVARIATE LUCAS POLYNOMIALS. J. Amasya Univ. Inst. Sci. Technol. 2020;1(2):142-50.

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