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A New Method of Matrix Decomposition to Get the Determinants and Inverses of r-Circulant Matrices with Fibonacci and Lucas Numbers

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  • Jiangming Ma
  • Tao Qiu
  • Chengyuan He
  • Firdous A. Shah

Abstract

We use a new method of matrix decomposition for r-circulant matrix to get the determinants of An=CircrF1,F2,…,Fn and Bn=CircrL1,L2,…,Ln, where Fn is the Fibonacci numbers and Ln is the Lucas numbers. Based on these determinants and the nonsingular conditions, inverse matrices are derived. The expressions of the determinants and inverse matrices are represented by Fibonacci and Lucas Numbers. In this study, the formulas of determinants and inverse matrices are much simpler and concise for programming and reduce the computational time.

Suggested Citation

  • Jiangming Ma & Tao Qiu & Chengyuan He & Firdous A. Shah, 2021. "A New Method of Matrix Decomposition to Get the Determinants and Inverses of r-Circulant Matrices with Fibonacci and Lucas Numbers," Journal of Mathematics, Hindawi, vol. 2021, pages 1-9, November.
  • Handle: RePEc:hin:jjmath:4782594
    DOI: 10.1155/2021/4782594
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