Results 231 to 240 of about 13,753 (265)
Phylogenetic and Population Genetic Analyses Reveal Patterns of Divergence Among Isolates of <i>Ceratocystis manginecans</i>. [PDF]
Ecol EvolLynn KMT +6 more
europepmc +1 more source
Using Celebrity to Advance Equality
Journal of Social Philosophy, EarlyView.
Alfred Archer
wiley +1 more source
[Rezension von:] Maeda, John: Design by numbers. - Cambridge, MA, USA : MIT Press, 2001
, 2003 Wilson, Stephen 1944-2011
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Chaos, Solitons and Fractals, 2021 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Yasemin Alp, E Gökçen Kocer
exaly +3 more sources
Logic Journal of the IGPLAbstract This note covers some of the history of Leonardo numbers. We retrieve some of the most recent results on this sequence, as well as some relevant historical interconnections. In the end, we also provide some conjectures and open problems for some of its extensions involving the modular periodicity.
Carlos M. da Fonseca +3 more
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On Gaussian Leonardo Hybrid Polynomials [PDF]
Symmetry, 2023 In the present paper, we first study the Gaussian Leonardo numbers and Gaussian Leonardo hybrid numbers. We give some new results for the Gaussian Leonardo numbers, including relations with the Gaussian Fibonacci and Gaussian Lucas numbers, and also give
Tulay Yagmur
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Some new families of generalized \(k\)-Leonardo and Gaussian Leonardo numbers
2023Based on the authors abstract, this paper, introduces a new family of the generalized \(k\)-Leonardo numbers and study their properties. The authors investigate the Gaussian Leonardo numbers and associated new families of these Gaussian forms. They also obtain combinatorial identities like Binet formula, Cassini's identity, partial sum, etc.
Prasad, Kalika +3 more
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Common terms of Leonardo and Jacobsthal numbers
Rendiconti del Circolo Matematico di Palermo Series 2, 2023As a particular case of the Lucas sequences of the first kind, the sequence of Jacobsthal numbers \( \{J_m\}_{m\ge 0} \) is defined by the linear recurrence relation: \( J_0=0 \), \( J_1=1 \), and \( J_{m}=J_{m-1}+2J_{m-2} \) for all \( m\ge 2 \).
Bensella, Hayat, Behloul, Djilali
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2022
In literature until today, many authors have studied special sequences in different number systems. In this paper, using the Leonardo numbers, we introduce the bicomplex Leonardo numbers. Also, we give some algebraic properties of bicomplex Leonardo numbers such as recurrence relation, generating function, Binet’s formula, D’Ocagne’s identity, Cassini ...
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In literature until today, many authors have studied special sequences in different number systems. In this paper, using the Leonardo numbers, we introduce the bicomplex Leonardo numbers. Also, we give some algebraic properties of bicomplex Leonardo numbers such as recurrence relation, generating function, Binet’s formula, D’Ocagne’s identity, Cassini ...
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Leonardo Numbers and their Bicomplex Extension
Nepal Journal of Mathematical SciencesThis paper introduces a new type of Leonardo numbers, referred to as bicomplex Leonardoi numbers. Also, some important relations, including the generating function, Binet's formula, D'Ocagne's identity, Cassini’s identity, and Catalan’s identity. Furthermore, we present the relationship between Lucas, Fibonacci, and Leonardo numbers.
Molhu Prasad Jaiswal +2 more
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