Ultimate boundedness results for solutions of certain third order nonlinear matrix differential equations
M. O. Omeike, A. U. Afuwape (2010)
Kragujevac Journal of Mathematics
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Displaying similar documents to “A note on indecomposability of Boolean matrices”
Ultimate boundedness results for solutions of certain third order nonlinear matrix differential equations
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Marian Gewert (1993)
Colloquium Mathematicae
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Measuring the performance for parallel matrix multiplication algorithm.
Aldea, Costel (2005)
Acta Universitatis Apulensis. Mathematics - Informatics
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On bounded solutions to systems of linear functional-differential equations.
Hakl, R. (1999)
Georgian Mathematical Journal
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The maximum of the smallest maximal coordinate of the minimum vectors in 6-lattices equals 1.
Végh, A. (2005)
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Anisotropic complex structure on the pseudo-Euclidean Hurwitz pairs
W. Królikowski (1991)
Annales Polonici Mathematici
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The concept of supercomplex structure is introduced in the pseudo-Euclidean Hurwitz pairs and its basic algebraic and geometric properties are described, e.g. a necessary and sufficient condition for the existence of such a structure is found.
A 1-norm bound for inverses of triangular matrices with monotone entries.
Berenhaut, Kenneth S., Guy, Richard T., Vish, Nathaniel G. (2008)
Banach Journal of Mathematical Analysis [electronic only]
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The number of indecomposable Schur rings over a cyclic 2-group.
Kovács, István (2004)
Séminaire Lotharingien de Combinatoire [electronic only]
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Note on the -boundedness of the solutions of a system of differential equations.
Diamandescu, A. (2004)
Acta Mathematica Universitatis Comenianae. New Series
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Generalized Rudin-Shapiro sequences
Jean-Paul Allouche, Pierre Liardet (1991)
Acta Arithmetica
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High-order methods for semilinear singularly perturbed boundary value problems.
Radeka, Ivana, Herceg, Dragoslav (2003)
Novi Sad Journal of Mathematics
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Evaluation of divisor functions of matrices
Gautami Bhowmik (1996)
Acta Arithmetica
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1. Introduction. The study of divisor functions of matrices arose legitimately in the context of arithmetic of matrices, and the question of the number of (possibly weighted) inequivalent factorizations of an integer matrix was asked. However, till now only partial answers were available. Nanda [6] evaluated the case of prime matrices and Narang [7] gave an evaluation for 2×2 matrices. We obtained a recursion in the size of the matrices and the weights of the divisors [1,2] which helped...
Note on some greatest common divisor matrices
Peter Lindqvist, Kristian Seip (1998)
Acta Arithmetica
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Some quadratic forms related to "greatest common divisor matrices" are represented in terms of L²-norms of rather simple functions. Our formula is especially useful when the size of the matrix grows, and we will study the asymptotic behaviour of the smallest and largest eigenvalues. Indeed, a sharp bound in terms of the zeta function is obtained. Our leading example is a hybrid between Hilbert's matrix and Smith's matrix.