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On Dual $k-$ Pell Bicomplex Numbers and Some Identities Including Them

Year 2020, Volume: 3 Issue: 1, 86 - 93, 10.06.2020
https://doi.org/10.33401/fujma.718298

Abstract

In the paper, we have considered the real and dual bicomplex numbers separately. Firstly, we examine the dual numbers and investigate the characteristic properties of them. Then, we give the definition, feature and related concepts about bicomplex numbers. And we define the number of dual $k-$ Pell bicomplex numbers that are not found for the first time in the literature and we examine the norm and conjugate properties of these numbers. We give equations about conjugates and give also some important characteristic of these newly defined numbers, and we write the recursive correlations of these numbers. Using these relations we give some important identities such as Vajda's, Honsberger's and d'Ocagne identities.

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References

  • [1] P. Catarino, On some identities and generating functions for k-Pell numbers, Int. J. of Math. Anal., 7(38) (2013), 1877-1884.
  • [2] P. Catarino, Bicomplex k-Pell quaternions, Comput. Methods Funct. Theory, 19(1) (2019), 65-76.
  • [3] S. Halici, On Some Pell Polynomials. Acta Uni. Apul., 29(2012), 105-112.
  • [4] D. Alpay, M. E. Luna-Elizarraras, M. Shapiro, D. C. Struppa, Basics of Functional Analysis with Bicomplex Scalars, and Bicomplex Schur analysis, Springer Sci. and Business Media, (2014).
  • [5] F. Babadag, Fibonacci, Lucas numbers with dual bicomplex numbers, J. Math. Sci., 10(1-2) (2018), 161-172.
  • [6] A. T. Benjamin, S. S. Plott, J. A. Sellers, Tiling proofs of recent sum identities involving Pell numbers, Ann. Comb., 12(3) (2008), 271-278.
  • [7] M. A. Gungor, A. Cihan, On dual-hyperbolic numbers with generalized Fibonacci and Lucas numbers components, Fundam. J. Math. Appl., 2(2) (2019), 162-172, doi: 10.33401/fujma.617415.
  • [8] S. Halici, On Bicomplex Fibonacci Numbers and Their Generalization, In Models and Theories in Social Systems (pp. 509-524), Springer, Cham, (2019).
  • [9] S. Ö . Karakuş, F. K. Aksoyak, Generalized bicomplex numbers and Lie groups, Adv. Appl. Clifford Alg., 25(4) (2015), 943-963.
  • [10] M. E. Luna-Elizarraras, M. Shapiro, D. C. Struppa, A. Vajiac, Bicomplex numbers and their elementary functions, Cubo(Temuco), 14(2) (2012), 61-80.
Year 2020, Volume: 3 Issue: 1, 86 - 93, 10.06.2020
https://doi.org/10.33401/fujma.718298

Abstract

Project Number

-

References

  • [1] P. Catarino, On some identities and generating functions for k-Pell numbers, Int. J. of Math. Anal., 7(38) (2013), 1877-1884.
  • [2] P. Catarino, Bicomplex k-Pell quaternions, Comput. Methods Funct. Theory, 19(1) (2019), 65-76.
  • [3] S. Halici, On Some Pell Polynomials. Acta Uni. Apul., 29(2012), 105-112.
  • [4] D. Alpay, M. E. Luna-Elizarraras, M. Shapiro, D. C. Struppa, Basics of Functional Analysis with Bicomplex Scalars, and Bicomplex Schur analysis, Springer Sci. and Business Media, (2014).
  • [5] F. Babadag, Fibonacci, Lucas numbers with dual bicomplex numbers, J. Math. Sci., 10(1-2) (2018), 161-172.
  • [6] A. T. Benjamin, S. S. Plott, J. A. Sellers, Tiling proofs of recent sum identities involving Pell numbers, Ann. Comb., 12(3) (2008), 271-278.
  • [7] M. A. Gungor, A. Cihan, On dual-hyperbolic numbers with generalized Fibonacci and Lucas numbers components, Fundam. J. Math. Appl., 2(2) (2019), 162-172, doi: 10.33401/fujma.617415.
  • [8] S. Halici, On Bicomplex Fibonacci Numbers and Their Generalization, In Models and Theories in Social Systems (pp. 509-524), Springer, Cham, (2019).
  • [9] S. Ö . Karakuş, F. K. Aksoyak, Generalized bicomplex numbers and Lie groups, Adv. Appl. Clifford Alg., 25(4) (2015), 943-963.
  • [10] M. E. Luna-Elizarraras, M. Shapiro, D. C. Struppa, A. Vajiac, Bicomplex numbers and their elementary functions, Cubo(Temuco), 14(2) (2012), 61-80.
There are 10 citations in total.

Details

Primary Language English
Subjects Mathematical Sciences
Journal Section Articles
Authors

Serpil Halıcı 0000-0002-8071-0437

Şule Çürük This is me 0000-0002-4514-6156

Project Number -
Publication Date June 10, 2020
Submission Date January 11, 2020
Acceptance Date January 9, 2020
Published in Issue Year 2020 Volume: 3 Issue: 1

Cite

APA Halıcı, S., & Çürük, Ş. (2020). On Dual $k-$ Pell Bicomplex Numbers and Some Identities Including Them. Fundamental Journal of Mathematics and Applications, 3(1), 86-93. https://doi.org/10.33401/fujma.718298
AMA Halıcı S, Çürük Ş. On Dual $k-$ Pell Bicomplex Numbers and Some Identities Including Them. Fundam. J. Math. Appl. June 2020;3(1):86-93. doi:10.33401/fujma.718298
Chicago Halıcı, Serpil, and Şule Çürük. “On Dual $k-$ Pell Bicomplex Numbers and Some Identities Including Them”. Fundamental Journal of Mathematics and Applications 3, no. 1 (June 2020): 86-93. https://doi.org/10.33401/fujma.718298.
EndNote Halıcı S, Çürük Ş (June 1, 2020) On Dual $k-$ Pell Bicomplex Numbers and Some Identities Including Them. Fundamental Journal of Mathematics and Applications 3 1 86–93.
IEEE S. Halıcı and Ş. Çürük, “On Dual $k-$ Pell Bicomplex Numbers and Some Identities Including Them”, Fundam. J. Math. Appl., vol. 3, no. 1, pp. 86–93, 2020, doi: 10.33401/fujma.718298.
ISNAD Halıcı, Serpil - Çürük, Şule. “On Dual $k-$ Pell Bicomplex Numbers and Some Identities Including Them”. Fundamental Journal of Mathematics and Applications 3/1 (June 2020), 86-93. https://doi.org/10.33401/fujma.718298.
JAMA Halıcı S, Çürük Ş. On Dual $k-$ Pell Bicomplex Numbers and Some Identities Including Them. Fundam. J. Math. Appl. 2020;3:86–93.
MLA Halıcı, Serpil and Şule Çürük. “On Dual $k-$ Pell Bicomplex Numbers and Some Identities Including Them”. Fundamental Journal of Mathematics and Applications, vol. 3, no. 1, 2020, pp. 86-93, doi:10.33401/fujma.718298.
Vancouver Halıcı S, Çürük Ş. On Dual $k-$ Pell Bicomplex Numbers and Some Identities Including Them. Fundam. J. Math. Appl. 2020;3(1):86-93.

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