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| Khuếch tán Stefan-Maxwell× | Xấp xỉ Boussinesq× | Các Định luật Fick× | |
|---|---|---|---|
| Lĩnh vực | Nhiệt động lực học | Nhiệt động lực học | Nhiệt động lực học |
| Họ | Process / pipeline | Process / pipeline | Process / pipeline |
| Năm ra đời≠ | 1871 | 1903 | 1855 |
| Người khởi xướng≠ | Josef Stefan and James Clerk Maxwell | Joseph Boussinesq | Adolf Fick |
| Loại≠ | Diffusion equation | Approximation technique | Diffusion law |
| Công trình gốc≠ | Reid, R. C., Prausnitz, J. M., & Poling, B. E. (1987). The Properties of Gases and Liquids (4th ed.). McGraw-Hill. ISBN: 978-0071247009 | Boussinesq, J. (1903). Théorie Analytique de la Chaleur. Gauthier-Villars. link ↗ | Fick, A. (1855). On liquid diffusion. Philosophical Magazine, 10(63), 30-39. DOI ↗ |
| Tên gọi khác | Stefan-Maxwell equation, multicomponent diffusion | buoyancy approximation, Boussinesq model | diffusion equation, Fickian diffusion |
| Liên quan | 3 | 3 | 3 |
| Tóm tắt≠ | The Stefan-Maxwell diffusion equation describes how multiple chemical species diffuse through each other in a mixture, accounting for interactions between all species pairs. Unlike Fick's law, which assumes species diffuse independently, Stefan-Maxwell theory captures the coupling that occurs when species with different diffusivities move at different rates. This is essential for analyzing gas separation, combustion, catalytic processes, and reactive distillation. | The Boussinesq Approximation simplifies the governing equations for natural convection by treating density as constant except in the buoyancy term. This approximation is valid when temperature variations produce small density changes and allows researchers to solve coupled heat-fluid flow problems without solving the full, nonlinear compressibility equations. The Boussinesq Approximation is fundamental to analyzing buoyancy-driven flows in buildings, enclosures, and geophysical applications. | Fick's Laws describe how species diffuse through media due to concentration gradients. The First Law (steady-state) relates diffusion flux to concentration gradient, while the Second Law (transient) describes how concentration changes over time. These laws are fundamental to mass transfer analysis, applying to gases, liquids, and solids. Fick's Laws are analogous to Fourier's Law of heat conduction, replacing temperature with concentration. |
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