Altıntaş, Ismet; Taşköprü, Kemal; Beyaztaş, Merve Bracket polynomials of torus links as Fibonacci polynomials. (English) Zbl 1470.57003 Int. J. Adv. Appl. Math. Mech. 5, No. 3, 35-43 (2018). Summary: In this paper we work the bracket polynomial of \((2, n)\)-torus link as a Fibonacci polynomial. We show that the bracket polynomial of \((2, n)\)-torus link provides recurrence relation as similar to the Fibonacci polynomial and give its some fundamental properties. We also prove important identities, which are similar to the Fibonacci identities, for the bracket polynomial of \((2, n)\)-torus link and prove Fibonacci-like identities of the Jones polynomial of \((2, n)\)-torus link as a result of the bracket polynomial. Finally, we observe that the bracket polynomial of \((2, n)\)-torus link and therefore its Jones polynomial can be derived from its Alexander-Conway polynomial or classical Fibonacci polynomial. Cited in 1 Document MSC: 57K10 Knot theory 11B39 Fibonacci and Lucas numbers and polynomials and generalizations Keywords:bracket polynomial; torus link; Fibonacci polynomial; Fibonacci identities; Jones polynomial × Cite Format Result Cite Review PDF Full Text: Link References: [1] J.W. Alexander, Topological invariants of knots and links, Trans. Amer. Math. Soc. 30 (1928) 275-308. · JFM 54.0603.03 [2] ˙I. Altınta¸s, An oriented state model for the Jones polynomial and its applications alternating links, Appl. Math. Comput. 194 (2007) 198-178. · Zbl 1193.57003 [3] R.D. Brandt, W.B.R. Lickorish, K.C. Millett, A polynomial invariant for unoriented knots and links, Invent. Math. 84 (1986) 563-573. · Zbl 0595.57009 [4] J.H. Conway, An enumeration of knots and kinks, and some of their algebraic properties, In: Computational Problems in Abstract Algebra, Pergamon, Oxford (1970) 329-358. · Zbl 0202.54703 [5] P. Freyd, D. Yetter, J. Hoste, W.B.R. Lickorish, K. Millett, A. 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