1. Thermal shape fluctuations of a two-dimensional compressible droplet
- Author
-
Marc Durand, Antoine Calmettes, and François Villemot
- Subjects
Surface (mathematics) ,0303 health sciences ,Capillary wave ,Bulk modulus ,Materials science ,Cellular Potts model ,General Chemistry ,Mechanics ,Condensed Matter Physics ,01 natural sciences ,Characterization (materials science) ,Physics::Fluid Dynamics ,03 medical and health sciences ,0103 physical sciences ,Thermal ,Calibration ,Compressibility ,010306 general physics ,030304 developmental biology - Abstract
Analysis of thermal capillary waves on the surface of a liquid usually assumes incompressibility of the bulk fluid. However, for droplets or bubbles with submicronic size, or for epithelial cells whose out-of-plane elongation can be modeled by an effective 2D bulk modulus, compressibility of the internal fluid must be taken into account for the characterization of their shape fluctuations. We present a theoretical analysis of the fluctuations of a two-dimensional compressible droplet. Analytical expressions for area, perimeter and energy fluctuations are derived and compared with Cellular Potts Model (CPM) simulations. This comparison shows a very good agreement between theory and simulations, and offers a precise calibration method for CPM simulations.
- Published
- 2020
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