Liu hard disk equation of state: Difference between revisions

Revision as of 19:59, 24 October 2020

The Liu equation of state for hard disks (2-dimensional hard spheres) is given by Eq. 1, 9 and 13 of ^[1].

For the stable fluid:

Z_{v}={\frac {1+\eta ^{2}/8+\eta ^{4}/18-4\eta ^{4}/21}{(1-\eta )^{2}}}

where the packing fraction is given by $\eta =\pi \rho \sigma ^{2}/4$ where $\rho$ is density and $\sigma$ is the diameter of the disks.

The EoS for the stable fluid, liquid-hexatic transition region and hexatic:

Z_{lh}=Z_{v}+{\frac {b_{1}\eta ^{m_{1}}+b_{2}\eta ^{m_{2}}}{(1-c\eta )}}

The global EoS for all phases:

$Z=Z_{lh}$ , $\eta <=0.72$

$Z=Z_{solid}$ , $\eta >0.72$

where: $Z_{solid}={\frac {2}{\alpha }}+1.9+\alpha -5.2\alpha ^{2}+114.48\alpha ^{4}$

and $\alpha ={\frac {2}{3^{1/2}\rho \sigma ^{2}}}$

@@ Line 5: / Line 5: @@
 :<math>Z_v = \frac{1 + \eta^2/8 + \eta^4/18 - 4 \eta^4/21}{(1-\eta)^2} </math>
-where the packing fraction is given by <math>\eta = \pi \rho \sigma^2 /4 </math> where <math>\sigma</math> is the diameter of the disks.
+where the packing fraction is given by <math>\eta = \pi \rho \sigma^2 /4 </math> where  <math>\rho</math> is density and <math>\sigma</math> is the diameter of the disks.
 The EoS for the stable fluid, liquid-hexatic transition region and hexatic: