Solution behavior for parametric implicit complementarity problems (Q1207313)
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scientific article; zbMATH DE number 149496
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Solution behavior for parametric implicit complementarity problems |
scientific article; zbMATH DE number 149496 |
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Solution behavior for parametric implicit complementarity problems (English)
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1 April 1993
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The following parametric implicit complementarity problem is considered in finite-dimensional Euclidean spaces: Find \(x\) such that \(x-G(x)\geq 0\), \(F(x,\varepsilon)\geq 0\), \(F(x,\varepsilon)^ T\) \((x-G(x))=0\). Conditions are described under which the solution \(x(.)\) --- depending on the parameter \(\varepsilon\) --- is locally unique, Lipschitz-continuous, \(B\)- differentiable and Fréchet-differentiable, respectively.
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parametric implicit complementarity problem
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Lipschitz-continuous
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\(B\)- differentiable
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Fréchet-differentiable
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0.9156703
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0.9156703
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0.90290624
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0.90281045
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0.89392316
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0.8891409
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0.8890999
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