Square well model: Difference between revisions

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Square well model:
The '''square well model''' is given by <ref>[http://dx.doi.org/10.1063/1.1696904 A. Rotenberg "Monte Carlo Equation of State for Hard Spheres in an Attractive Square Well", Journal of Chemical Physics '''43''' pp. 1198-1201 (1965)]</ref>


:<math>
:<math>
V\left( r \right) =  
\Phi_{12}\left( r \right) =  
\left\{ \begin{array}{ccc}
\left\{ \begin{array}{ccc}
\infty & ; & r < \sigma \\
\infty & ; & r < \sigma \\
Line 9: Line 9:
</math>
</math>


where V(r) is the potential energy of interaction between pairs of particles, r is the distance, &sigma; is the hard diameter
where <math>\Phi_{12}(r)</math> is the [[intermolecular pair potential]], <math>\epsilon</math> is the well depth, <math>r</math> is the distance between site 1 and site 2  <math>r := |\mathbf{r}_1 - \mathbf{r}_2|</math>, &sigma; is the hard diameter
and &lambda; &gt; 1.
and &lambda; &gt; 1. For an infinitesimally narrow well one has the [[sticky hard sphere model]] proposed by Baxter.
==Equation of state==
:''Main article: [[Equations of state for the square well model]]''
==Virial coefficients==
:''Main article: [[Square well potential: virial coefficients]]''
==Liquid-vapour coexistence==
<ref>[http://dx.doi.org/10.1080/00268970902889642 Achille Giacometti, Giorgio Pastore and Fred Lado "Liquid-vapor coexistence in square-well fluids: an RHNC study", Molecular Physics '''107''' pp. 555-562 (2009)]</ref>
==Critical point==
<ref>[http://dx.doi.org/10.1063/1.1677949 John J. Kozak, I. B. Schrodt and K. D. Luks "Square-Well Potential. II. Some Comments on Critical Point Behavior and Scaling Laws", Journal of Chemical Physics '''57''' pp. 206- (1972)]</ref>
<ref>[http://dx.doi.org/10.1063/1.462080 Lourdes Vega, Enrique de Miguel, Luis F. Rull, George Jackson, and Ian A. McLure "Phase equilibria and critical behavior of square‐well fluids of variable width by Gibbs ensemble Monte Carlo simulation", Journal of Chemical Physics  '''96''' pp. 2296-2305 (1992)]</ref>
<ref>[http://dx.doi.org/10.1080/00268970902889659 Marianela Martiacuten-Betancourt, José Manuel Romero-Enrique and Luis F. Rull "Finite-size scaling study of the liquid-vapour critical point of dipolar square-well fluids", Molecular Physics '''107''' pp. 563-570 (2009)]</ref>
==Direct correlation function==
[[Direct correlation function]] <ref>[http://dx.doi.org/10.1063/1.3154583  S. Hlushak, A. Trokhymchuk, and S. Sokolowski "Direct correlation function of the square-well fluid with attractive well width up to two particle diameters", Journal of Chemical Physics '''130''' 234511 (2009)]</ref>.
==Helmholtz energy function==
[[Helmholtz energy function]] <ref>[https://doi.org/10.1080/00268976.2017.1392051 Francisco Sastre, Elizabeth Moreno-Hilario, Maria Guadalupe Sotelo-Serna and Alejandro Gil-Villegas "Microcanonical-ensemble computer simulation of the high-temperature expansion coefficients of the Helmholtz free energy of a square-well fluid", Molecular Physics '''116''' pp. 351-360 (2018)]</ref>
<ref>[https://doi.org/10.1080/00268976.2018.1461943 Fernando del Río, Orlando Guzmán & Félix Ordoñez Martínez "Global square-well free-energy model via singular value decomposition", Molecular Physics '''116''' pp. 2070-2082 (2018)]</ref>.
==See also==
*[[2-dimensional square well model]]
==References==
<references/>
'''Related reading'''
*[http://dx.doi.org/10.1063/1.1712308      J. A. Barker and D. Henderson "Perturbation Theory and Equation of State for Fluids: The Square-Well Potential", Journal of Chemical Physics '''47''' pp. 2856-2861 (1967)]
*[http://dx.doi.org/10.1002/9780470142561.ch4 Kraemer D. Luks and John J. Kozak "The Statistical Mechanics of Square-Well Fluids", Advances in Chemical Physics '''37''' chapter 4 pp.  139-201 (1978)]
*[http://dx.doi.org/10.1063/1.2137713 Elisabeth Schöll-Paschinger,    Ana Laura Benavides and Ramon Castañeda-Priego "Vapor-liquid equilibrium and critical behavior of the square-well fluid of variable range: A theoretical study", Journal of Chemical Physics '''123''' 234513 (2005)]
*[http://dx.doi.org/10.1063/1.2338307  R. López-Rendón, Y. Reyes and P. Orea "Thermodynamic properties of short-range square well fluid", Journal of Chemical Physics '''125''' 084508 (2006)]
*[http://dx.doi.org/10.1063/1.4826469  Yuri Reyes , César A. Flores-Sandoval  and Pedro Orea "Common behavior of the critical properties of the 2D and 3D square-well fluids", Journal of Chemical Physics '''139''' 164505 (2013)]
*[http://dx.doi.org/10.1063/1.4930268  J. Richard Elliott, Andrew J. Schultz and David A. Kofke "Combined temperature and density series for fluid-phase properties. I. Square-well spheres", Journal of Chemical Physics '''143''' 114110 (2015)]
*[http://dx.doi.org/10.1063/1.4993436 L. A. Padilla and A. L. Benavides "The constant force continuous molecular dynamics for potentials with multiple discontinuities", Journal of Chemical Physics '''147''' 034502 (2017)]


 
[[Category: Models]]
==References==

Latest revision as of 10:00, 9 July 2018

The square well model is given by [1]

where is the intermolecular pair potential, is the well depth, is the distance between site 1 and site 2 , σ is the hard diameter and λ > 1. For an infinitesimally narrow well one has the sticky hard sphere model proposed by Baxter.

Equation of state[edit]

Main article: Equations of state for the square well model

Virial coefficients[edit]

Main article: Square well potential: virial coefficients

Liquid-vapour coexistence[edit]

[2]

Critical point[edit]

[3] [4] [5]

Direct correlation function[edit]

Direct correlation function [6].

Helmholtz energy function[edit]

Helmholtz energy function [7] [8].

See also[edit]

References[edit]

  1. A. Rotenberg "Monte Carlo Equation of State for Hard Spheres in an Attractive Square Well", Journal of Chemical Physics 43 pp. 1198-1201 (1965)
  2. Achille Giacometti, Giorgio Pastore and Fred Lado "Liquid-vapor coexistence in square-well fluids: an RHNC study", Molecular Physics 107 pp. 555-562 (2009)
  3. John J. Kozak, I. B. Schrodt and K. D. Luks "Square-Well Potential. II. Some Comments on Critical Point Behavior and Scaling Laws", Journal of Chemical Physics 57 pp. 206- (1972)
  4. Lourdes Vega, Enrique de Miguel, Luis F. Rull, George Jackson, and Ian A. McLure "Phase equilibria and critical behavior of square‐well fluids of variable width by Gibbs ensemble Monte Carlo simulation", Journal of Chemical Physics 96 pp. 2296-2305 (1992)
  5. Marianela Martiacuten-Betancourt, José Manuel Romero-Enrique and Luis F. Rull "Finite-size scaling study of the liquid-vapour critical point of dipolar square-well fluids", Molecular Physics 107 pp. 563-570 (2009)
  6. S. Hlushak, A. Trokhymchuk, and S. Sokolowski "Direct correlation function of the square-well fluid with attractive well width up to two particle diameters", Journal of Chemical Physics 130 234511 (2009)
  7. Francisco Sastre, Elizabeth Moreno-Hilario, Maria Guadalupe Sotelo-Serna and Alejandro Gil-Villegas "Microcanonical-ensemble computer simulation of the high-temperature expansion coefficients of the Helmholtz free energy of a square-well fluid", Molecular Physics 116 pp. 351-360 (2018)
  8. Fernando del Río, Orlando Guzmán & Félix Ordoñez Martínez "Global square-well free-energy model via singular value decomposition", Molecular Physics 116 pp. 2070-2082 (2018)

Related reading