Continuous Dependence for the Linear Differential Equations of Thermo-Diffusion ()
ABSTRACT
In this paper, we establish the structural stability for the linear differential equations of thermo-diffusion in a semi-infinite pipe flow. Using the technology of a second-order differential inequality, we prove the continuous dependence on the density ρ and the coefficient of thermal conductivity K. These results show that small changes for these coefficients can’t cause tremendous changes for the solutions.
Share and Cite:
Shi, J. (2020) Continuous Dependence for the Linear Differential Equations of Thermo-Diffusion.
Journal of Applied Mathematics and Physics,
8, 1291-1303. doi:
10.4236/jamp.2020.87099.
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