Some equalities and binomial sums about the generalized Fibonacci number un

Yücel Türker Ulutaş and Derya Toy
Notes on Number Theory and Discrete Mathematics
Print ISSN 1310–5132, Online ISSN 2367–8275
Volume 28, 2022, Number 2, Pages 252–260
DOI: 10.7546/nntdm.2022.28.2.252-260
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Authors and affiliations

Yücel Türker Ulutaş
Department of Mathematics, University of Kocaeli
Kocaeli, Turkey

Derya Toy
Institute of Science and Technology, University of Kocaeli
Kocaeli, Turkey

Abstract

In this study, we take the generalized Fibonacci sequence \{u_{n}\} as u_{0}=0,u_{1}=1 and \ u_{n}=ru_{n-1}+u_{n-2} for n>1, where r is a non-zero integer. Based on Halton’s paper in [4], we derive three interrelated functions involving the terms of generalized Fibonacci sequence \{u_{n}\}. Using these three functions we introduce a simple approach to obtain a lot of identities, binomial sums and alternate binomial sums involving the terms of generalized Fibonacci sequence \{u_{n}\}.

Keywords

  • Generalized Fibonacci numbers
  • Sums of generalized Fibonacci numbers
  • Binomial sums

2020 Mathematics Subject Classification

  • 11B37
  • 11B39
  • 11B65

References

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Manuscript history

  • Received: 4 June 2021
  • Revised: 28 April 2022
  • Accepted: 5 May 2022
  • Online First: 6 May 2022

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Cite this paper

Türker Ulutaş, Y., & Toy, D. (2022). Some equalities and binomial sums about the generalized Fibonacci number un. Notes on Number Theory and Discrete Mathematics, 28(2), 252-260, DOI: 10.7546/nntdm.2022.28.2.252-260.

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