Determinants of Toeplitz–Hessenberg Matrices with Generalized Leonardo Number Entries
Annales Mathematicae SilesianaeLet un = un(k) denote the generalized Leonardo number defined recursively by un = un−1 + un−2 + k for n ≥ 2, where u0 = u1 = 1. Terms of the sequence un(1) are referred to simply as Leonardo numbers.
Goy Taras, Shattuck Mark
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Non-power positional number representation systems, bijective numeration, and the Mesoamerican discovery of zero. [PDF]
Heliyon, 2021 Rojo-Garibaldi B +3 more
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Tri–Periodic Fibonacci Numbers and Tri–Periodic Leonardo Numbers
Banu Yılmaz, Yüksel Soykan
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The science of art: Leonardo Da Vinci and facial plastic surgery. [PDF]
Curr Opin Otolaryngol Head Neck Surg, 2020 Shaye DA.
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Optimizing Dimensions in Furniture Design: A Literature Review
BioResourcesWooden furniture design necessitates the integration of both technological requirements and aesthetic considerations. To guide designers in achieving this balance, this article explores how established design principles, such as proportions and preferred
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A Uniform Funnel Array for DOA Estimation in FANET Using Fibonacci Sampling. [PDF]
Sensors (Basel)Huo S, Zhang M, Liu Y, Zhu S.
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A brief summary of L.J.F. Broer's work up till his retirement [PDF]
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Eco-Inspired terraform networks emerge from material self-organization. [PDF]
Sci RepConvertino M, Migliore E, Martines A.
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Quantitative plant biology-Old and new. [PDF]
Quant Plant Biol, 2021 Morris RJ, Ten Tusscher KH.
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Leonardo Fibonacci and Frederick II: An encounter of Islamic mathematics with Europe
Daniele C. Struppa
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