Ramp model: Difference between revisions

The ramp model, proposed by Jagla ^[1] and sometimes known as the Jagla model, is described by:

${\displaystyle \Phi _{12}(r)=\left\{{\begin{array}{ll}\infty &{\rm {if}}\;r<\sigma \\W_{r}-(W_{r}-W_{a}){\frac {r-\sigma }{d_{a}-\sigma }}&{\rm {if}}\;\sigma \leq r\leq d_{a}\\W_{a}-W_{a}{\frac {r-d_{a}}{d_{c}-d_{a}}}&{\rm {if}}\;d_{a}<r\leq d_{c}\\0&{\rm {if}}\;r>d_{c}\end{array}}\right.}$

where ${\displaystyle \Phi _{12}(r)}$ is the intermolecular pair potential, ${\displaystyle r:=|\mathbf {r} _{1}-\mathbf {r} _{2}|}$, ${\displaystyle W_{r}>0}$ and ${\displaystyle W_{a}<0}$.

Graphically, one has:

where the red line represents an attractive implementation of the model, and the green line a repulsive implementation.

Critical points

For the particular case ${\displaystyle W_{r}^{*}=3.5;W_{a}^{*}=-1.0,d_{a}^{*}=1.72,d_{c}^{*}=3.0}$, the liquid-vapour critical point is located at ^[2]:

${\displaystyle T_{c}^{*}=1.487\pm 0.003}$

${\displaystyle \rho _{c}\sigma ^{3}=0.103\pm 0.001}$

${\displaystyle p_{c}^{*}\simeq 0.042}$

and the liquid-liquid critical point:

${\displaystyle T_{c}^{*}\simeq 0.378\pm 0.003}$

${\displaystyle \rho _{c}\sigma ^{3}\simeq 0.380\pm 0.002}$

${\displaystyle p_{c}^{*}/T_{c}^{*}\simeq 0.49\pm 0.01}$

Repulsive Ramp Model

In the repulsive ramp case, where ${\displaystyle W_{a}=0}$, neither liquid-vapor nor liquid-liquid stable equilibria occur ^[2]. However, for this model a low density crystalline phase has been found. This solid phase presents re-entrant melting, i.e. this solid melts into the fluid phase as the pressure is increased.

Lattice gas version

Recently, similar behaviour has been found in a three-dimensional Repulsive Ramp Lattice Gas model ^[3] The system is defined on a simple cubic lattice. The interaction is that of a lattice hard sphere model with exclusion of nearest neighbours of occupied positions plus a repulsive interaction with next-to-nearest neighbours. The total potential energy of the system is then given by:

${\displaystyle U=\epsilon \sum _{[ij]}S_{i}S_{j}}$

where ${\displaystyle \epsilon >0}$ ; ${\displaystyle [ij]}$ refers to all the pairs of sites that are second neighbors, and ${\displaystyle S_{k}}$ indicates the occupation of site ${\displaystyle k}$ (0 indicates an empty site, 1 indicates an occupied site).

See also

• Polyamorphism: Ramp model

References

Related literature

• Limei Xu, Sergey V. Buldyrev, C. Austen Angell, and H. Eugene Stanley "Thermodynamics and dynamics of the two-scale spherically symmetric Jagla ramp model of anomalous liquids", Physical Review E 74 031108 (2006)
• Limei Xu, Sergey V. Buldyrev, Nicolas Giovambattista, C. Austen Angell, and H. Eugene Stanley "A monatomic system with a liquid-liquid critical point and two distinct glassy states", Journal of Chemical Physics 130 054505 (2009)