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The Jacobsthal Sequences in The Groups Q2n, Q2nXqZ2m and Q2nXZ2m
Abstract
In [8], Deveci et.al defined the generalized order-k Jacobsthal orbit kG of a finitely generated group GA J A, where ka ,ka A1,,a a2,, to be the sequence of the elements of G such that ix
Keywords
References
- C. M. Campbell, H. Doostie and E. F. Robertson, Fibonacci length of generating pairs in groups in Applications of Fibonacci Numbers, Vol. 3 Eds. G. E. Bergum et al. Kluwer Academic Publishers, (1990), 27-35.
- O. Deveci, The Pell-Padovan sequences and the Jacobsthal-Padovan sequences in finite groups, Utilitas Mathematica, in press. O. Deveci, The polytopic-k-step Fibonacci sequences in finite groups, Discrete Dynamics in Nature and Society, 431840-1-431840-12 (2011).
- O. Deveci, The k-nacci sequences and the generalized order-k Pell sequences in the semi-direct product of finite cyclic groups, Chiang Mai Journal of Science, 40(1) (2013), 89-98.
- O. Deveci and E. Karaduman, The generalized order-k Lucas sequences in Finite groups, Journal of Applied Mathematics, 464580-1- 464580-15 (2012).
- O. Deveci and E. Karaduman, Recurrence sequences in groups, LAMBERT Acedemic Publishing, Germany, 2013.
- O. Deveci and E. Karaduman, The Pell sequences in finite groups, Utilitas Mathematica, in press. O. Deveci, E. Karaduman and G. Saglam, The Jacobsthal sequences in finite groups, Bulletin of Iranian Mathematical Society, is submitted in 2012-06-24.
- H. Doostie and P. P. Campbell, On the commutator lengths of certain classes of finitely presented groups, International Journal of Mathematics and Mathematical Sciences, Volume 2006, Article ID 74981, Pages 1-9, DOI 10.1155/IJMMS/2006/74981.
- D.L. Johnson, Presentations of Groups, 2nd edition, London Math. Soc. Student Texts 15, Cambridge University Press, Cambridge 1997.
Details
Primary Language
Turkish
Subjects
-
Journal Section
-
Publication Date
August 1, 2013
Submission Date
March 13, 2015
Acceptance Date
-
Published in Issue
Year 2013 Volume: 1 Number: 2
APA
Deveci, O., & Saglam, G. (2013). The Jacobsthal Sequences in The Groups 2n 2n. New Trends in Mathematical Sciences, 1(2), 13-17. https://izlik.org/JA35RZ85ZX
AMA
1.Deveci O, Saglam G. The Jacobsthal Sequences in The Groups 2n 2n. New Trends in Mathematical Sciences. 2013;1(2):13-17. https://izlik.org/JA35RZ85ZX
Chicago
Deveci, Omur, and Gencay Saglam. 2013. “The Jacobsthal Sequences in The Groups 2n 2n”. New Trends in Mathematical Sciences 1 (2): 13-17. https://izlik.org/JA35RZ85ZX.
EndNote
Deveci O, Saglam G (August 1, 2013) The Jacobsthal Sequences in The Groups 2n 2n. New Trends in Mathematical Sciences 1 2 13–17.
IEEE
[1]O. Deveci and G. Saglam, “The Jacobsthal Sequences in The Groups 2n 2n”, New Trends in Mathematical Sciences, vol. 1, no. 2, pp. 13–17, Aug. 2013, [Online]. Available: https://izlik.org/JA35RZ85ZX
ISNAD
Deveci, Omur - Saglam, Gencay. “The Jacobsthal Sequences in The Groups 2n 2n”. New Trends in Mathematical Sciences 1/2 (August 1, 2013): 13-17. https://izlik.org/JA35RZ85ZX.
JAMA
1.Deveci O, Saglam G. The Jacobsthal Sequences in The Groups 2n 2n. New Trends in Mathematical Sciences. 2013;1:13–17.
MLA
Deveci, Omur, and Gencay Saglam. “The Jacobsthal Sequences in The Groups 2n 2n”. New Trends in Mathematical Sciences, vol. 1, no. 2, Aug. 2013, pp. 13-17, https://izlik.org/JA35RZ85ZX.
Vancouver
1.Omur Deveci, Gencay Saglam. The Jacobsthal Sequences in The Groups 2n 2n. New Trends in Mathematical Sciences [Internet]. 2013 Aug. 1;1(2):13-7. Available from: https://izlik.org/JA35RZ85ZX