Minimal realizations of the matrix transition Lie group for bilinear control systems: Explicit results (Q1095080)
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scientific article; zbMATH DE number 4027274
| Language | Label | Description | Also known as |
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| English | Minimal realizations of the matrix transition Lie group for bilinear control systems: Explicit results |
scientific article; zbMATH DE number 4027274 |
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Minimal realizations of the matrix transition Lie group for bilinear control systems: Explicit results (English)
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1987
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Magnus exponentiation and Wei-Norman factorization are two different representations of the solutions of bilinear control systems evolving on matrix Lie groups. However, the techniques used so far do not allow their effective construction, in general. In this article, the authors derive explicit formulas for those representations and also the relation between them.
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minimal realizations
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Magnus exponentiation
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Wei-Norman factorization
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bilinear control systems
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matrix Lie groups
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0.91505647
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0.9018365
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0.89650136
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