An Interpretation of the Moore-Penrose Generalized Inverse of a Singular Fisher Information Matrix

Ela the Moore - Penrose Inverse of a Free Matrix

A matrix is free, or generic, if its nonzero entries are algebraically independent. Necessary and sufficient combinatorial conditions are presented for a complex free matrix to have a free Moore-Penrose inverse. These conditions extend previously known results for square, nonsingular free matrices. The result used to prove this characterization relates the combinatorial structure of a free matr...

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The Moore-Penrose inverse of a free matrix

A matrix is free, or generic, if its nonzero entries are algebraically independent. Necessary and sufficient combinatorial conditions are presented for a complex free matrix to have a free Moore-Penrose inverse. These conditions extend previously known results for square, nonsingular free matrices. The result used to prove this characterization relates the combinatorial structure of a free matr...

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The Moore-Penrose Generalized Inverse for Sums of Matrices

In this paper we exhibit, under suitable conditions, a neat relationship between the Moore–Penrose generalized inverse of a sum of two matrices and the Moore–Penrose generalized inverses of the individual terms. We include an application to the parallel sum of matrices. AMS 1991 subject classifications. Primary 15A09; secondary 15A18.

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Fast computing of the Moore-Penrose inverse matrix

In this article a fast computational method is provided in order to calculate the Moore-Penrose inverse of full rank m× n matrices and of square matrices with at least one zero row or column. Sufficient conditions are also given for special type products of square matrices so that the reverse order law for the Moore-Penrose inverse is satisfied.

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Ela Fast Computing of the Moore - Penrose Inverse Matrix

In this article a fast computational method is provided in order to calculate the Moore-Penrose inverse of full rank m× n matrices and of square matrices with at least one zero row or column. Sufficient conditions are also given for special type products of square matrices so that the reverse order law for the Moore-Penrose inverse is satisfied.

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An Interpretation of the Moore-Penrose Generalized Inverse of a Singular Fisher Information Matrix

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منابع مشابه

Ela the Moore - Penrose Inverse of a Free Matrix

The Moore-Penrose inverse of a free matrix

The Moore-Penrose Generalized Inverse for Sums of Matrices

Fast computing of the Moore-Penrose inverse matrix

Ela Fast Computing of the Moore - Penrose Inverse Matrix

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