Coupled translational and rotational diffusion in liquids
- 1 February 1982
- journal article
- Published by AIP Publishing in Journal of Mathematical Physics
- Vol. 23 (2) , 296-309
- https://doi.org/10.1063/1.525352
Abstract
The equations for coupled translational and rotational diffusion of asymmetric molecules immersed in a fluid are obtained. The method used begins with the Kramers–Liouville equation and leads to the generalized Smoluchowski equation for diffusion in the presence of potentials. Both external potentials and intermolecular potentials are considered. The contraction of the description from the Kramers–Liouville equation to the Smoluchowski equation is achieved by using a combination of operator calculus and cumulants. Explicit solutions to these equations are obtained for the two-dimensional case. Comparison of our results with earlier literature is also presented.Keywords
This publication has 10 references indexed in Scilit:
- Maxwell $$\xrightarrow[{t \to \infty }]{}$$ BoltzmannJournal of Statistical Physics, 1980
- Time ordered operator cumulants: Statistical independence and noncommutativityJournal of Mathematical Physics, 1979
- Gaussian stochastic processes in physicsPhysics Reports, 1978
- Cumulant expansion of a Fokker–Planck equation: Rotational and translational motion in dense fluidsThe Journal of Chemical Physics, 1976
- Critique of the generalized cumulant expansion methodJournal of Mathematical Physics, 1976
- Generalized Einstein relations for rotational and translational diffusion of molecules including spinThe Journal of Chemical Physics, 1975
- Fluctuating hydrodynamics and Brownian motionJournal of Statistical Physics, 1973
- Brownian Motion of Polyatomic Molecules: The Coupling of Rotational and Translational MotionsThe Journal of Chemical Physics, 1966
- Theory of the Rotational Brownian Motion of a Free Rigid BodyPhysical Review B, 1960
- Stochastic Problems in Physics and AstronomyReviews of Modern Physics, 1943