Polynomials whose coefficients are generalized Leonardo numbers
Author:
Affiliation:
1. Department of Mathematics University of Tennessee Knoxville , TN USA
Publisher
Walter de Gruyter GmbH
Link
https://www.degruyter.com/document/doi/10.1515/ms-2024-0023/pdf
Reference20 articles.
1. Benjamin, A. T.—Quinn, J. J.: Proofs that Really Count: The Art of Combinatorial Proof, Mathematical Association of America, Washington, DC, 2003.
2. Bicknell-Johnson, M.: Divisibility properties of the Fibonacci numbers minus one, generalized to Cn = Cn–1 + Cn–2 + k, Fibonacci Quart. 28(2) (1990), 107–112.
3. Bicknell-Johnson, M.—Bergum, G. E.: The generalized Fibonacci numbers Cn, Cn = Cn–1 + Cn–2 + k. In: Applications of Fibonacci Numbers (A. N. Philippou et al., eds.), D. Reidel, Dordrecht, Holland, 1988, pp. 193–205.
4. Dijkstra, E. W.: Fibonacci numbers and Leonardo numbers, EWD-797, University of Texas at Austin, 1981; available online at https://www.cs.utexas.edu/users/EWD/transcriptions/EWD07xx/EWD797.html.
5. Dijkstra, E. W.: Smoothsort: an alternative to sorting in situ, Sci. Comput. Program. 1(3) (1982), 223–233.
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