On the nonequilibrium statistical mechanics of a binary mixture. II. The transport coefficients |
| |
Authors: | L. S. García-Colín A. Flores E. Braun |
| |
Affiliation: | (1) Centro Nuclear, Instituto Nacional de Energia Nuclear, México 18, D. F., Mexico;(2) Facultad de Ciencias, Universidad Nacional Autónoma de México, México 20, D. F., México |
| |
Abstract: | This paper is devoted to the study of the hydrodynamic stage of a two-component dense fluid. Starting from the BBGKY hierarchy obtained earlier, we first derive the expressions for the generalized fluxes. We proceed to set up the generalized kinetic equations, using Bogoliubov's functional assumption. Then we solve these equations by means of a Chapman-Enskog method. The generalized expressions for the transport coefficients are thus obtained. All our results are independent of the existence of density expansions of the relevant quantities. |
| |
Keywords: | Transport coefficients for a binary mixture convergent kinetic theory fluxes and conjugated forces for a binary mixture Soret coefficient Dufour coefficient shear and bulk viscosities for a binary mixture |
本文献已被 SpringerLink 等数据库收录! |