A Note On The Generalizations of Jacobthal and Jacobthal-Lucas Sequences

Yashwant Panwar

Araştırma Makalesi

A Note On The Generalizations of Jacobthal and Jacobthal-Lucas Sequences

Yıl 2020, Cilt: 2 Sayı: 1, 28 - 43, 30.07.2020

Yashwant Panwar

Öz

In this paper, we present the generalization of Jacobsthal and Jacobsthal-Lucas sequences by the recurrence relations,,,,,,,,,,,,,,,,, with the initial conditions,,,,,,,,,,,,,,,,,,,,,, . We establish some of the interesting properties of involving them. Also we describe and derive sums, connection formulae and Generating function. We have used their Binet’s formula to derive the identities.

Anahtar Kelimeler

Generalized Jacobsthal sequence, Generalized Jacobsthal-Lucas sequence, Binet’s formula, Generating function

Kaynakça

[1] Bilgici, G. (2014) New Generalizations of Fibonacci and Lucas Sequences. Applied Mathematical Sciences, 8(29): 1429-1437.
[2] Falcon, S. (2001) On the k-Lucas Numbers. International Journal of Contemporary Mathematical Sciences, 6(21): 1039-1050.
[3] Falcon, S., Plaza, A. (2007) On the k-Fibonacci Numbers. Chaos,Solitons and Fractals, 32(5): 1615-1624.
[4] Gupta, V. K., Panwar, Y. K. (2012) Common Factors of Generalized Fibonacci, Jacobsthal and Jacobsthal-Lucas numbers. International Journal of Applied Mathematical Research, 1(4): 377-382.
[5] Gupta, V. K., Panwar, Y. K., Sikhwal, O. (2012) Generalized Fibonacci Sequences. Theoretical Mathematics & Applications, 2(2): 115-124.
[6] Horadam, A. F., (1961) A Generalized Fibonacci Sequence. American Mathematical Monthly, 68(5): 455-459.
[7] Horadam, A. F., (1996) Jacobsthal representation numbers. The Fibonacci Quarterly, 34(1): 40-54.
[8] Kalman, D., Mena, R. (2002) The Fibonacci Numbers–Exposed. The Mathematical Magazine, 2.
[9] Koshy, T. (2001) Fibonacci and Lucas numbers with applications. New York, Wiley- Interscience.
[10] Panwar, Y. K., Rathore, G. P. S., Chawla, R. (2014) On the k-Fibonacci-like numbers. Turkish J. Anal. Number Theory, 2(1): 9-12.
[11] Panwar, Y. K., Singh, B., Gupta, V. K. (2013) Generalized Identities Involving Common Factors of Generalized Fibonacci, Jacobsthal and Jacobsthal-Lucas numbers. International journal of Analysis and Application, 3(1): 53-59.
[12] Panwar, Y. K., Singh, B., Gupta, V. K. (2013) Identities Involving Common Factors of Generalized Fibonacci, Jacobsthal and Jacobsthal-Lucas numbers. Applied Mathematics and and Physic, 1(4): 126-128.
[13] Singh, B., Bhadouria, P., Sikhwal, O. (2013) Generalized Identities Involving Common Factors of Fibonacci and Lucas Numbers. International Journal of Algebra, 5(13): 637-645.
[14] Singh, B., Sikhwal, O., Bhatnagar, S. (2010) Fibonacci-Like Sequence and its Properties. Int. J. Contemp. Math. Sciences, 5(18): 859-868.
[15] Singh, B., Sisodiya, K., Ahmed, F. (2014) On the Products of k-Fibonacci Numbers and k-Lucas Numbers. International Journal of Mathematics and Mathematical Sciences. Article ID 505798, 4 pages. http://dx.doi.org/10.1155/2014/505798
[16] Suvarnamani, A., Tatong, M. (2015) Some Properties of (𝑝, 𝑞)-Fibonnacci Numbers. Science and Technology RMUTT Journal, 5(2): 17-21.
[17] Suvarnamani, A., Tatong, M. (2016) Some Properties of (𝑝, 𝑞)-Lucas Numbers. Kyungpook Mathematical Journal, 56(2): 367-370.
[18] Taşyurdu, Y. (2019) Generalized (𝑝, 𝑞)-Fibonacci-Like Sequences and Their Properties. Journal of Research, 11(6): 43-52.
[19] Taşyurdu, Y., Cobanoğlu, N., Dilmen, Z. (2016) On The a New Family of k-Fibonacci Numbers. Erzincan University Journal of Science and Thechnology, 9(1): 95-101.
[20] Thongmoon, M. (2009) Identities for the common factors of Fibonacci and Lucas numbers. International Mathematical Forum, 4(7): 303–308.
[21] Thongmoon, M. (2009) New identities for the even and odd Fibonacci and Lucas numbers. International Journal of Contemporary Mathematical Sciences, 4(14): 671–676.
[22] Uygun, S., Owusu, E. (2016) A new generalization of Jacobsthal numbers (Bi-Periodic Jacobsthal Sequences). Journal of Mathematical Analysis, 7(4): 28-39.
[23] Uygun, S., Owusu, E. (2019) A new generalization of Jacobsthal numbers (Bi-Periodic Jacobsthal Lucas Sequences). Journal of Advances in Mathematics and Computer Science, 34(5): 1-13.
[24] Wani, A. A., Catarino, P., Rafiq, R. U. (2018) On the Properties of k-Fibonacci-Like Sequence. International Journal of Mathematics And its Applications, 6(1-A): 187-198.
[25] Wani, A. A., Rathore, G. P. S., Sisodiya, K. (2016) On The Properties of Fibonacci-Like Sequence. International Journal of Mathematics Trends and Technology, 29(2): 80-86.
[26] Yagmur, T. (2019) New Approach to Pell and Pell-Lucas Sequence. Kyungpook Mathematical Journal, 59(1): 23-34.

Yıl 2020, Cilt: 2 Sayı: 1, 28 - 43, 30.07.2020

Yashwant Panwar

Öz

Kaynakça

[1] Bilgici, G. (2014) New Generalizations of Fibonacci and Lucas Sequences. Applied Mathematical Sciences, 8(29): 1429-1437.
[2] Falcon, S. (2001) On the k-Lucas Numbers. International Journal of Contemporary Mathematical Sciences, 6(21): 1039-1050.
[3] Falcon, S., Plaza, A. (2007) On the k-Fibonacci Numbers. Chaos,Solitons and Fractals, 32(5): 1615-1624.
[4] Gupta, V. K., Panwar, Y. K. (2012) Common Factors of Generalized Fibonacci, Jacobsthal and Jacobsthal-Lucas numbers. International Journal of Applied Mathematical Research, 1(4): 377-382.
[5] Gupta, V. K., Panwar, Y. K., Sikhwal, O. (2012) Generalized Fibonacci Sequences. Theoretical Mathematics & Applications, 2(2): 115-124.
[6] Horadam, A. F., (1961) A Generalized Fibonacci Sequence. American Mathematical Monthly, 68(5): 455-459.
[7] Horadam, A. F., (1996) Jacobsthal representation numbers. The Fibonacci Quarterly, 34(1): 40-54.
[8] Kalman, D., Mena, R. (2002) The Fibonacci Numbers–Exposed. The Mathematical Magazine, 2.
[9] Koshy, T. (2001) Fibonacci and Lucas numbers with applications. New York, Wiley- Interscience.
[10] Panwar, Y. K., Rathore, G. P. S., Chawla, R. (2014) On the k-Fibonacci-like numbers. Turkish J. Anal. Number Theory, 2(1): 9-12.
[11] Panwar, Y. K., Singh, B., Gupta, V. K. (2013) Generalized Identities Involving Common Factors of Generalized Fibonacci, Jacobsthal and Jacobsthal-Lucas numbers. International journal of Analysis and Application, 3(1): 53-59.
[12] Panwar, Y. K., Singh, B., Gupta, V. K. (2013) Identities Involving Common Factors of Generalized Fibonacci, Jacobsthal and Jacobsthal-Lucas numbers. Applied Mathematics and and Physic, 1(4): 126-128.
[13] Singh, B., Bhadouria, P., Sikhwal, O. (2013) Generalized Identities Involving Common Factors of Fibonacci and Lucas Numbers. International Journal of Algebra, 5(13): 637-645.
[14] Singh, B., Sikhwal, O., Bhatnagar, S. (2010) Fibonacci-Like Sequence and its Properties. Int. J. Contemp. Math. Sciences, 5(18): 859-868.
[15] Singh, B., Sisodiya, K., Ahmed, F. (2014) On the Products of k-Fibonacci Numbers and k-Lucas Numbers. International Journal of Mathematics and Mathematical Sciences. Article ID 505798, 4 pages. http://dx.doi.org/10.1155/2014/505798
[16] Suvarnamani, A., Tatong, M. (2015) Some Properties of (𝑝, 𝑞)-Fibonnacci Numbers. Science and Technology RMUTT Journal, 5(2): 17-21.
[17] Suvarnamani, A., Tatong, M. (2016) Some Properties of (𝑝, 𝑞)-Lucas Numbers. Kyungpook Mathematical Journal, 56(2): 367-370.
[18] Taşyurdu, Y. (2019) Generalized (𝑝, 𝑞)-Fibonacci-Like Sequences and Their Properties. Journal of Research, 11(6): 43-52.
[19] Taşyurdu, Y., Cobanoğlu, N., Dilmen, Z. (2016) On The a New Family of k-Fibonacci Numbers. Erzincan University Journal of Science and Thechnology, 9(1): 95-101.
[20] Thongmoon, M. (2009) Identities for the common factors of Fibonacci and Lucas numbers. International Mathematical Forum, 4(7): 303–308.
[21] Thongmoon, M. (2009) New identities for the even and odd Fibonacci and Lucas numbers. International Journal of Contemporary Mathematical Sciences, 4(14): 671–676.
[22] Uygun, S., Owusu, E. (2016) A new generalization of Jacobsthal numbers (Bi-Periodic Jacobsthal Sequences). Journal of Mathematical Analysis, 7(4): 28-39.
[23] Uygun, S., Owusu, E. (2019) A new generalization of Jacobsthal numbers (Bi-Periodic Jacobsthal Lucas Sequences). Journal of Advances in Mathematics and Computer Science, 34(5): 1-13.
[24] Wani, A. A., Catarino, P., Rafiq, R. U. (2018) On the Properties of k-Fibonacci-Like Sequence. International Journal of Mathematics And its Applications, 6(1-A): 187-198.
[25] Wani, A. A., Rathore, G. P. S., Sisodiya, K. (2016) On The Properties of Fibonacci-Like Sequence. International Journal of Mathematics Trends and Technology, 29(2): 80-86.
[26] Yagmur, T. (2019) New Approach to Pell and Pell-Lucas Sequence. Kyungpook Mathematical Journal, 59(1): 23-34.

Toplam 26 adet kaynakça vardır.

Ayrıntılar

Birincil Dil	İngilizce
Konular	Matematik
Bölüm	Kabul edilmiş makaleler
Yazarlar	Yashwant Panwar
Yayımlanma Tarihi	30 Temmuz 2020
Kabul Tarihi	2 Eylül 2020
Yayımlandığı Sayı	Yıl 2020 Cilt: 2 Sayı: 1

Kaynak Göster

APA	Panwar, Y. (2020). A Note On The Generalizations of Jacobthal and Jacobthal-Lucas Sequences. Ikonion Journal of Mathematics, 2(1), 28-43.
AMA	Panwar Y. A Note On The Generalizations of Jacobthal and Jacobthal-Lucas Sequences. ikjm. Temmuz 2020;2(1):28-43.
Chicago	Panwar, Yashwant. “A Note On The Generalizations of Jacobthal and Jacobthal-Lucas Sequences”. Ikonion Journal of Mathematics 2, sy. 1 (Temmuz 2020): 28-43.
EndNote	Panwar Y (01 Temmuz 2020) A Note On The Generalizations of Jacobthal and Jacobthal-Lucas Sequences. Ikonion Journal of Mathematics 2 1 28–43.
IEEE	Y. Panwar, “A Note On The Generalizations of Jacobthal and Jacobthal-Lucas Sequences”, ikjm, c. 2, sy. 1, ss. 28–43, 2020.
ISNAD	Panwar, Yashwant. “A Note On The Generalizations of Jacobthal and Jacobthal-Lucas Sequences”. Ikonion Journal of Mathematics 2/1 (Temmuz 2020), 28-43.
JAMA	Panwar Y. A Note On The Generalizations of Jacobthal and Jacobthal-Lucas Sequences. ikjm. 2020;2:28–43.
MLA	Panwar, Yashwant. “A Note On The Generalizations of Jacobthal and Jacobthal-Lucas Sequences”. Ikonion Journal of Mathematics, c. 2, sy. 1, 2020, ss. 28-43.
Vancouver	Panwar Y. A Note On The Generalizations of Jacobthal and Jacobthal-Lucas Sequences. ikjm. 2020;2(1):28-43.

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