Some considerations of matrix equations using the concept of reproductivity

Branko Malešević; Biljana Radičić

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Bessel matrix differential equations: explicit solutions of initial and two-point boundary value problems

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In this paper we consider Bessel equations of the type $t^{2} X^{(2)} (t) + t X^{(1)} (t) + (t^{2} I - A^{2}) X (t) = 0$ , where A is an n $\times$ n complex matrix and X(t) is an n $\times$ m matrix for t > 0. Following the ideas of the scalar case we introduce the concept of a fundamental set of solutions for the above equation expressed in terms of the data dimension. This concept allows us to give an explicit closed form solution of initial and two-point boundary value problems related to the Bessel equation.

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Karol Pąk (2008)

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In this paper I present the Kronecker-Capelli theorem which states that a system of linear equations has a solution if and only if the rank of its coefficient matrix is equal to the rank of its augmented matrix.MML identifier: MATRIX15, version: 7.8.09 4.97.1001

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Janashia, G., Lagvilava, E. (1997)

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Invertibility of Matrices of Field Elements

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In this paper the theory of invertibility of matrices of field elements (see e.g. [5], [6]) is developed. The main purpose of this article is to prove that the left invertibility and the right invertibility are equivalent for a matrix of field elements. To prove this, we introduced a special transformation of matrix to some canonical forms. Other concepts as zero vector and base vectors of field elements are also introduced as a preparation.MML identifier: MATRIX14, version: 7.9.01 4.101.1015 ...

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