\(L^ 1\) nonlinear stability of traveling waves for a hyperbolic system with relaxation (Q678068)
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scientific article; zbMATH DE number 1000163
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | \(L^ 1\) nonlinear stability of traveling waves for a hyperbolic system with relaxation |
scientific article; zbMATH DE number 1000163 |
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\(L^ 1\) nonlinear stability of traveling waves for a hyperbolic system with relaxation (English)
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16 April 1997
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We investigate nonlinear stability of traveling wave solutions to the following (semilinear) hyperbolic \(2\times 2\) system with a relaxation source term \[ {\partial u\over\partial t}+{\partial v\over\partial x}=0,\quad{\partial v\over\partial t}+\alpha {\partial u\over\partial x}= {1\over\varepsilon} (f(u)- v)\qquad (\varepsilon>0), \] where \((x,t)\in\mathbb{R}\times \mathbb{R}_+\). The unknowns \(u\), \(v\) belong to \(\mathbb{R}\), the function \(f=f(u)\) is in \(C^1(\mathbb{R})\), and \(\alpha>0\) is a fixed constant.
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relaxation source term
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