Van der Waals' density gradient theory: Difference between revisions
Jump to navigation
Jump to search
(New page: This can be considered as the first density-functional theory. The grand potential of an interface is expressed as :<math>\Omega = \int dr \omega(\rho(...) |
Carl McBride (talk | contribs) m (Slight tidy) |
||
| (One intermediate revision by the same user not shown) | |||
| Line 1: | Line 1: | ||
'''Van der Waals' density gradient theory''' can be considered to be the first [[density-functional theory]]. | |||
The [[Grand canonical ensemble | grand potential ]] of an interface is expressed as | The [[Grand canonical ensemble | grand potential ]] of an interface is expressed as | ||
| Line 10: | Line 10: | ||
==References== | ==References== | ||
# J.S. Rowlinson and B. Widom "Molecular Theory of Capillarity". Dover 2002 (originally: Oxford University Press 1982 | # J. D. van der Waals and P. Kohnstamm "Lehrbuch der Thermostatik", Verlag Von Johann Ambrosius Barth, Leipzig (1927) | ||
# J. S. Rowlinson and B. Widom "Molecular Theory of Capillarity". Dover 2002 (originally: Oxford University Press 1982) | |||
[[category: Density-functional theory]] | [[category: Density-functional theory]] | ||
Latest revision as of 12:42, 29 October 2007
Van der Waals' density gradient theory can be considered to be the first density-functional theory.
The grand potential of an interface is expressed as
- ,
where a local approximation is employed in the first term ( being the grand potential density of the bulk system), and the variation in the density profile enters in the second term. This second term is the integral of the square of the density gradient, with a proportionality constant that is termed the influence parameter.
References[edit]
- J. D. van der Waals and P. Kohnstamm "Lehrbuch der Thermostatik", Verlag Von Johann Ambrosius Barth, Leipzig (1927)
- J. S. Rowlinson and B. Widom "Molecular Theory of Capillarity". Dover 2002 (originally: Oxford University Press 1982)