Determinants of the RFMLR circulant matrices with Perrin, Padovan, Tribonacci, and the generalized Lucas numbers (Q1714675)
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scientific article; zbMATH DE number 7010687
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Determinants of the RFMLR circulant matrices with Perrin, Padovan, Tribonacci, and the generalized Lucas numbers |
scientific article; zbMATH DE number 7010687 |
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Determinants of the RFMLR circulant matrices with Perrin, Padovan, Tribonacci, and the generalized Lucas numbers (English)
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1 February 2019
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Summary: The row first-minus-last right (RFMLR) circulant matrix and row last-minus-first left (RLMFL) circulant matrices are two special pattern matrices. By using the inverse factorization of polynomial, we give the exact formulae of determinants of the two pattern matrices involving Perrin, Padovan, Tribonacci, and the generalized Lucas sequences in terms of finite many terms of these sequences.
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