This paper focuses on a class of radiation hydrodynamics models where the transport coefficients depend on temperature, investigating in detail the existence of global strong solutions for the initial-boundary value problem. A local existence theory for solutions is established for a fluid model that incorporates radiation effects, with viscosity μ (θ) = θα and thermal conductivity κ (θ) = \ (k\) (1 + θβ), under specific initial conditions. Compared with the work of Wei et al. (2024), the results of the present work have two distinct advantages: first, our proof is time-uniform; second, it does not require higher integrability conditions on the solutions.
Building similarity graph...
Analyzing shared references across papers
Loading...
Anqi Xie
Asian Research Journal of Mathematics
Building similarity graph...
Analyzing shared references across papers
Loading...
Anqi Xie (Wed,) studied this question.
synapsesocial.com/papers/69db35be4fe01fead37c43ca — DOI: https://doi.org/10.9734/arjom/2026/v22i41077
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: