Spontaneous cavitation in a Lennard-Jones liquid: Molecular dynamics simulation and the van der Waals-Cahn-Hilliard gradient theory

The process of bubble nucleation in a Lennard-Jones (LJ) liquid is studied by molecular dynamics (MD) simulation. The bubble nucleation rate J is determined by the mean life-time method at temperatures above that of the triple point in the region of negative pressures. The results of simulation are...

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Bibliographic Details
Published in:The Journal of chemical physics 2016-02, Vol.144 (7), p.074502-074502
Main Author: Baidakov, Vladimir G.
Format: Article
Language:English
Subjects:
Bubbles
Cavitation
Computational fluid dynamics
Dependence
Equations of state
Molecular dynamics
Nucleation
Nuclei
Radius of curvature
Simulation
Surface tension
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Summary:The process of bubble nucleation in a Lennard-Jones (LJ) liquid is studied by molecular dynamics (MD) simulation. The bubble nucleation rate J is determined by the mean life-time method at temperatures above that of the triple point in the region of negative pressures. The results of simulation are compared with classical nucleation theory (CNT) and modified classical nucleation theory (MCNT), in which the work of formation of a critical bubble is determined in the framework of the van der Waals-Cahn-Hilliard gradient theory (GT). It has been found that the values of J obtained in MD simulation systematically exceed the data of CNT, and this excess in the nucleation rate reaches 8–10 orders of magnitude close to the triple point temperature. The results of MCNT are in satisfactory agreement with the data of MD simulation. To describe the properties of vapor-phase nuclei in the framework of GT, an equation of state has been built up which describes stable, metastable and labile regions of LJ fluids. The surface tension of critical bubbles γ has been found from CNT and data of MD simulation as a function of the radius of curvature of the surface of tension R *. The dependence γ(R *) has also been calculated from GT. The Tolman length has been determined, which is negative and in modulus equal to ≈(0.1 − 0.2) σ. The paper discusses the applicability of the Tolman formula to the description of the properties of critical nuclei in nucleation.
ISSN:0021-9606
1089-7690
DOI:10.1063/1.4941689