Stockmayer potential: Difference between revisions

The Stockmayer potential consists of the Lennard-Jones model with an embedded point dipole. Thus the Stockmayer potential becomes:

${\displaystyle \Phi (r,\theta _{1},\theta _{2},\phi )=4\epsilon \left[\left({\frac {\sigma }{r}}\right)^{12}-\left({\frac {\sigma }{r}}\right)^{6}\right]-{\frac {\mu ^{2}}{4\pi \epsilon _{0}r^{3}}}\left(2\cos \theta _{1}\cos \theta _{2}-\sin \theta _{1}\sin \theta _{2}\cos \phi \right)}$

where:

• ${\displaystyle \Phi (r)}$ is the intermolecular pair potential between two particles at a distance r;
• ${\displaystyle \sigma }$ is the diameter (length), i.e. the value of ${\displaystyle r}$ at ${\displaystyle \Phi (r)=0}$ ;
• ${\displaystyle \epsilon }$ : well depth (energy)
• ${\displaystyle \epsilon _{0}}$ is the permittivity of the vacuum
• ${\displaystyle \mu }$ is the dipole moment
• ${\displaystyle \theta _{1},\theta _{2}}$ is the inclination of the two dipole axes with respect to the intermolecular axis.
• ${\displaystyle \phi }$ is the azimuth angle between the two dipole moments

If one defines the reduced dipole moment, ${\displaystyle \mu ^{*}}$

${\displaystyle \mu ^{*}:={\sqrt {\frac {\mu ^{2}}{4\pi \epsilon _{0}\epsilon \sigma ^{3}}}}}$

one can rewrite the expression as

${\displaystyle \Phi (r,\theta _{1},\theta _{2},\phi )=\epsilon \left\{4\left[\left({\frac {\sigma }{r}}\right)^{12}-\left({\frac {\sigma }{r}}\right)^{6}\right]-\mu ^{*2}\left(2\cos \theta _{1}\cos \theta _{2}-\sin \theta _{1}\sin \theta _{2}\cos \phi \right)\left({\frac {\sigma }{r}}\right)^{3}\right\}}$

For this reason the potential is sometimes known as the Stockmayer 12-6-3 potential.

References

1. M. E. Van Leeuwe "Deviation from corresponding-states behaviour for polar fluids", Molecular Physics 82 pp. 383-392 (1994)