Counting determinants of Fibonacci-Hessenberg matrices using LU factorizations.
Li, Hsuan-Chu, Chen, Young-Ming, Tan, Eng-Tjioe (2009)
Integers
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Displaying similar documents to “Generalized Cauchy determinants.”
Counting determinants of Fibonacci-Hessenberg matrices using LU factorizations.
Determinants and inverses of circulant matrices with complex Fibonacci numbers
Ercan Altınışık, N. Feyza Yalçın, Şerife Büyükköse (2015)
Special Matrices
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Let ℱn = circ (︀F*1 , F*2, . . . , F*n︀ be the n×n circulant matrix associated with complex Fibonacci numbers F*1, F*2, . . . , F*n. In the present paper we calculate the determinant of ℱn in terms of complex Fibonacci numbers. Furthermore, we show that ℱn is invertible and obtain the entries of the inverse of ℱn in terms of complex Fibonacci numbers.
Explicit formulas for the constituent matrices. Application to the matrix functions
R. Ben Taher, M. Rachidi (2015)
Special Matrices
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We present a constructive procedure for establishing explicit formulas of the constituents matrices. Our approach is based on the tools and techniques from the theory of generalized Fibonacci sequences. Some connections with other results are supplied. Furthermore,we manage to provide tractable expressions for the matrix functions, and for illustration purposes we establish compact formulas for both the matrix logarithm and the matrix pth root. Some examples are also provided. ...
Determinants of matrices related to the Pascal triangle
Roland Bacher (2002)
Journal de théorie des nombres de Bordeaux
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The aim of this paper is to study determinants of matrices related to the Pascal triangle.
Recounting determinants for a class of Hessenberg matrices.
Benjamin, Arthur T., Shattuck, Mark A. (2007)
Integers
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Computing the determinants by reducing the orders by four.
Gjonbalaj, Qefsere, Salihu, Armend (2010)
Applied Mathematics E-Notes [electronic only]
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Properties of the determinant of a rectangular matrix
Anna Makarewicz, Piotr Pikuta, Dominik Szałkowski (2014)
Annales Universitatis Mariae Curie-Sklodowska, sectio A – Mathematica
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In this paper we present new identities for the Radić’s determinant of a rectangular matrix. The results include representations of the determinant of a rectangular matrix as a sum of determinants of square matrices and description how the determinant is affected by operations on columns such as interchanging columns, reversing columns or decomposing a single column.
On matrices with non-positive off-diagonal elements and positive principal minors
Miroslav Fiedler, Vlastimil Pták (1962)
Czechoslovak Mathematical Journal
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Nearly principal minors of -matrices
Gerard Sierksma, Evert Jan Bakker (1986)
Compositio Mathematica
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Inequalities involving immanants and diagonal products for H-matrices and positive definite matrices
Johnson, Charles R., Merris, Russell, Pierce, Stephen (1985-1986)
Portugaliae mathematica
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Factorizations for q-Pascal matrices of two variables
Thomas Ernst (2015)
Special Matrices
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In this second article on q-Pascal matrices, we show how the previous factorizations by the summation matrices and the so-called q-unit matrices extend in a natural way to produce q-analogues of Pascal matrices of two variables by Z. Zhang and M. Liu as follows [...] We also find two different matrix products for [...]