报告摘要:
| The radiative Euler equations are a fundamental system to describe the motion of the compressible gas with radiation heat transfer phenomena. This report is devoted to the study of the wellposedness of the radiative Euler equations. By employing the anti-derivative method, we will show the unique global-in-time existence and the asymptotic stability of the solutions of the radiative Euler equations for the composite wave of two viscous shock waves with small strength. This method developed here is also helpful to other related problems with similar analytical difficulties.
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