Global existence of smooth solutions for the compressible viscous fluid flow with radiation in $\mathbb {R}^3$

O, Hyejong; Hong, Hakho; Kim, Jongsung

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O, Hyejong ; Hong, Hakho ; Kim, Jongsung

Global existence of smooth solutions for the compressible viscous fluid flow with radiation in $\mathbb {R}^3$. (English). Applications of Mathematics, vol. 68 (2023), issue 5, pp. 535-558

MSC: 35A01, 35B40, 76N10 | DOI: 10.21136/AM.2023.0059-22

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Keywords:
radiation hydrodynamics; Navier-Stokes system with radiation; existence; convergence rate

Summary:
This paper is concerned with the 3-D Cauchy problem for the compressible viscous fluid flow taking into account the radiation effect. For more general gases including ideal polytropic gas, we prove that there exists a unique smooth solutions in $[0,\infty )$, provided that the initial perturbations are small. Moreover, the time decay rates of the global solutions are obtained for higher-order spatial derivatives of density, velocity, temperature, and the radiative heat flux.

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