HMSA: Difference between revisions
Jump to navigation
Jump to search
Carl McBride (talk | contribs) No edit summary |
Carl McBride (talk | contribs) No edit summary |
||
| Line 1: | Line 1: | ||
The '''hybrid mean spherical approximation''' (HMSA) smoothly interpolates between the | The '''hybrid mean spherical approximation''' (HMSA) smoothly interpolates between the | ||
[[HNC]] and the [[mean spherical approximation]] closures | [[HNC]] and the [[mean spherical approximation]] closures | ||
<math>g(r) = \exp(-\beta u_r(r)) \left(1+\frac{\exp[f(r)(h(r)-c(r)-\beta u_a(r))]-1}{f(r)}\right)</math> | :<math>g(r) = \exp(-\beta u_r(r)) \left(1+\frac{\exp[f(r)(h(r)-c(r)-\beta u_a(r))]-1}{f(r)}\right)</math> | ||
where <math>g(r)</math> is the [[radial distribution function]]. | |||
==References== | ==References== | ||
[[Category:integral equations]] | [[Category:integral equations]] | ||
Revision as of 13:52, 16 March 2007
The hybrid mean spherical approximation (HMSA) smoothly interpolates between the HNC and the mean spherical approximation closures
![{\displaystyle g(r)=\exp(-\beta u_{r}(r))\left(1+{\frac {\exp[f(r)(h(r)-c(r)-\beta u_{a}(r))]-1}{f(r)}}\right)}](https://wikimedia.org/api/rest_v1/media/math/render/svg/7c0ef220abf1c6628033e2025a53f63a640d04d5)
where is the radial distribution function.
