The Drazin inverse of a semilinear transformation and its matrix representation (Q1095216)
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scientific article; zbMATH DE number 4027673
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | The Drazin inverse of a semilinear transformation and its matrix representation |
scientific article; zbMATH DE number 4027673 |
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The Drazin inverse of a semilinear transformation and its matrix representation (English)
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1987
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A transformation T is semilinear if \((ax+by)T=(xT)\bar a+(yT)\bar b\). The authors consider the Drazin inverse \(T^ d\) of a semilinear transformation on \(C^ n\). A canonical form for the matrix \(A^{\delta}\) of \(T^ d\) is given, and some of its properties are developed.
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Drazin inverse
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semilinear transformation
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canonical form
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0.9155997
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0.9115478
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0.9097363
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0.90666497
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0.90596336
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0.90529394
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0.9052221
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0.90441537
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