Irreducible sign \(k\)-potent sign pattern matrices (Q1124896)
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scientific article; zbMATH DE number 1371393
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Irreducible sign \(k\)-potent sign pattern matrices |
scientific article; zbMATH DE number 1371393 |
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Irreducible sign \(k\)-potent sign pattern matrices (English)
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29 November 1999
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A matrix whose entries are from the set \(\{ +, -, 0 \}\) is called a sign pattern matrix. A square sign pattern matrix \(A\) is called sign \(k\)-potent if \(k\) is the smallest positive integer for which \(A^{k+1} = A\) holds. (In the case \(k = 1\), \(A\) is called sign idempotent.) The authors not only present a full characterization of those irreducible sign pattern matrices that are sign \(k\)-potent but also provide canonical forms for such matrices.
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sign pattern matrices
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sign \(k\)-potent matrices
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irreducible matrices
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reduced block matrices
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canonical forms
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