The maximal and minimal ranks of some expressions of generalized inverses of matrices (Q1849326)
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scientific article; zbMATH DE number 1836979
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | The maximal and minimal ranks of some expressions of generalized inverses of matrices |
scientific article; zbMATH DE number 1836979 |
Statements
The maximal and minimal ranks of some expressions of generalized inverses of matrices (English)
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1 December 2002
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Maximal and minimal ranks of the matrix expression \(A-BXC\) with respect to \(X\) are determined. Using these results the maximal and minimal ranks of \(AA^-- A^-A\), \(BB^-A- AC^-C\), and \(B^-BA- ACC^-\) with respect to the choice of generalized inverses \(A^-\), \(B^-\), and \(C^-\) are found. Commutativity of \(A\) and \(A^-\), then \(A^k\) and \(A^-\), rank equalities for idempotent matrices, and maximal and minimal ranks of \(AA^- BB^-\) are discussed.
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generalized inverse
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idempotent matrix
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rank equality
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maximal and minimal ranks
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commutativity
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