Abstract
Many physical problems require explicit knowledge of the equilibrium shape of the interface between two fluid phases. Here, we present a new numerical method which is simply implementable and easily adaptable for a wide range of problems involving capillary deformations of fluid-fluid interfaces. We apply a simulated annealing algorithm to find the interface shape that minimizes the thermodynamic potential of the system. First, for completeness, we provide an analytical proof that minimizing this potential is equivalent to solving the Young-Laplace equation and the Young law. Then, we illustrate our numerical method showing two-dimensional results for fluid-fluid menisci between vertical or inclined walls and curved surfaces, capillary interactions between vertical walls, equilibrium shapes of sessile heavy droplets on a flat horizontal solid surface, and of droplets pending from flat or curved solid surfaces. Finally, we show illustrative three-dimensional results to point out the applicability of the method to micro-or nano-particles adsorbed at a fluid-fluid interface. (C) 2014 AIP Publishing LLC.
Original language | English |
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Article number | 244702 |
Number of pages | 13 |
Journal | Journal of Chemical Physics |
Volume | 141 |
Issue number | 24 |
DOIs | |
Publication status | Published - 28 Dec 2014 |
Keywords
- LIQUID-LIQUID INTERFACES
- OIL-WATER INTERFACE
- ANISOTROPIC PARTICLES
- CAPILLARY INTERACTIONS
- JANUS PARTICLES
- CONTACT ANGLES
- 2-DIMENSIONAL SUPERSTRUCTURES
- NANOPARTICLES
- MODEL
- NANOCRYSTALS