High-Prandtl-number thermocapillary liquid bridges with dynamically deformed interface: effect of an axial gas flow on the linear stability
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Publication:6177066
DOI10.1017/jfm.2023.944OpenAlexW4390667104MaRDI QIDQ6177066
Hendrik C. Kuhlmann, Mario Stojanović, Francesco Romanò
Publication date: 16 January 2024
Published in: Journal of Fluid Mechanics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1017/jfm.2023.944
Cites Work
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- Thermocapillary instabilities in liquid columns under co- and counter-current gas flows
- On convection cells induced by surface tension
- Instabilities of dynamic thermocapillary liquid layers. Part 1. Convective instabilities
- Instabilities of dynamic thermocapillary liquid layers. Part 2. Surface-wave instabilities
- Three-dimensional simulations of hydrodynamic instability in liquid bridges: Influence of temperature-dependent viscosity
- Convective thermocapillary instabilities in liquid bridges
- Linear-stability theory of thermocapillary convection in a model of the float-zone crystal-growth process
- Hydrodynamic instabilities in cylindrical thermocapillary liquid bridges
- ARPACK Users' Guide
- Convective instability mechanisms in thermocapillary liquid bridges
- Stability of thermocapillary flows in non-cylindrical liquid bridges
- Thermocapillary Instabilities
- Dynamic free-surface deformations in thermocapillary liquid bridges
- Hydrodynamical instabilities of thermocapillary flow in a half-zone
- Hydrothermal waves in a liquid bridge subjected to a gas stream along the interface
- Thermocapillary flow regimes and instability caused by a gas stream along the interface
- Viscous and resistive eddies near a sharp corner
- Analysis of the stability of axisymmetric jets
- Surface wave instability in the thermocapillary migration of a flat droplet
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