Soft sphere potential: Difference between revisions

The soft sphere potential is defined as

${\displaystyle \Phi _{12}\left(r\right)=\left\{{\begin{array}{lll}\epsilon \left({\frac {\sigma }{r}}\right)^{n}&;&r\leq \sigma \\0&;&r>\sigma \end{array}}\right.}$

where ${\displaystyle \Phi _{12}\left(r\right)}$ is the intermolecular pair potential between two soft spheres separated by a distance ${\displaystyle r:=|\mathbf {r} _{1}-\mathbf {r} _{2}|}$, ${\displaystyle \epsilon }$ is the interaction strength and ${\displaystyle \sigma }$ is the diameter of the sphere. Frequently the value of ${\displaystyle n}$ is taken to be 12, thus the model effectively becomes the high temperature limit of the Lennard-Jones model ^[1]. If ${\displaystyle n\rightarrow \infty }$ one has the hard sphere model. For ${\displaystyle n\leq 3}$ no thermodynamically stable phases are found.

Equation of state

The soft-sphere equation of state^[2] has recently been studied by Tan, Schultz and Kofke^[3] and expressed in terms of Padé approximants. For ${\displaystyle k_{B}T/\epsilon =1.0}$ and ${\displaystyle n=6}$ one has (Eq. 8):

${\displaystyle Z_{n=6}={\frac {1+7.432255\rho +23.854807\rho ^{2}+40.330195\rho ^{3}+34.393896\rho ^{4}+10.723480\rho ^{5}}{1+3.720037\rho +4.493218\rho ^{2}+1.554135\rho ^{3}}}}$

and for ${\displaystyle n=9}$ one has (Eq. 9):

${\displaystyle Z_{n=9}={\frac {1+3.098829\rho +5.188915\rho ^{2}+5.019851\rho ^{3}+2.673385\rho ^{4}+0.601529\rho ^{5}}{1+0.262771\rho +0.168052\rho ^{2}-0.010554\rho ^{3}}}}$

Virial coefficients

Tan, Schultz and Kofke^[3] have calculated the virial coefficients at ${\displaystyle k_{B}T/\epsilon =1.0}$ (Table 1):

	n=12	n=9	n=6
${\displaystyle B_{3}}$	3.79106644	4.27563423	5.55199919
${\displaystyle B_{4}}$	3.52761(6)	3.43029(7)	1.44261(4)
${\displaystyle B_{5}}$	2.1149(2)	1.08341(7)	-1.68834(9)
${\displaystyle B_{6}}$	0.7695(2)	-0.21449(11)	1.8935(5)
${\displaystyle B_{7}}$	0.0908(5)	-0.0895(7)	-1.700(3)
${\displaystyle B_{8}}$	-0.074(2)	0.071(4)	0.44(2)

Melting point

For ${\displaystyle n=12}$

pressure	${\displaystyle \rho _{\mathrm {melting} }}$	${\displaystyle \rho _{\mathrm {freezing} }}$	Reference
22.66(1)	1.195(6)	1.152(6)	Table 1 [4]
23.24(4)	1.2035(6)	1.1602(7)	Table 2 [3]

For ${\displaystyle n=9}$

pressure	${\displaystyle \rho _{\mathrm {melting} }}$	${\displaystyle \rho _{\mathrm {freezing} }}$	Reference
36.36(10)	1.4406(12)	1.4053(14)	Table 3 [3]

For ${\displaystyle n=6}$

pressure	${\displaystyle \rho _{\mathrm {melting} }}$	${\displaystyle \rho _{\mathrm {freezing} }}$	Reference
100.1(3)	2.320(2)	2.295(2)	Table 4 [3]

Glass transition

^[5]

Transport coefficients

^[6]

Radial distribution function

^[7]

References

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