A spectral theory for fingering on a prewetted plane
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Publication:3543803
DOI10.1063/1.870114zbMath1149.76593OpenAlexW2000336979MaRDI QIDQ3543803
Publication date: 5 December 2008
Published in: Physics of Fluids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1063/1.870114
Related Items (16)
The effect of surface tension on the gravity-driven thin film flow of Newtonian and power-law fluids ⋮ Contact-line fingering and rivulet formation in the presence of surface contamination ⋮ Thinning and disturbance growth in liquid films mobilized by continuous surfactant delivery ⋮ Instabilities in the flow of thin films on heterogeneous surfaces ⋮ Pattern formation in the flow of thin films down an incline: Constant flux configuration ⋮ Front and back instability of a liquid film on a slightly inclined plate ⋮ On a generalized approach to the linear stability of spatially nonuniform thin film flows ⋮ A spectral theory for small-amplitude miscible fingering ⋮ Transient dynamics and structure of optimal excitations in thermocapillary spreading: Precursor film model ⋮ Structure Formation in Thin Liquid Films ⋮ Flow on surfactant-laden thin films down an inclined plane ⋮ Unstable spreading of a fluid filament on a vertical plane: experiments and simulations ⋮ Surfactant-induced fingering phenomena in thin film flow down an inclined plane ⋮ Transient growth in driven contact lines ⋮ On nontrivial traveling waves in thin film flows including contact lines ⋮ Computing three-dimensional thin film flows including contact lines.
Cites Work
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- Asymptotic stability of solitary waves
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- Hydrodynamic Stability Without Eigenvalues
- Unsteady spreading of thin liquid films with small surface tension
- Viscous flow down a slope in the vicinity of a contact line
- Generation and Suppression of Radiation by Solitary Pulses
- Front dynamics and fingering of a driven contact line
- Stochastic forcing of the linearized Navier–Stokes equations
- Stability of Newtonian and viscoelastic dynamic contact lines
- Eigenvalues, and instabilities of solitary waves
- Linear stability and transient growth in driven contact lines
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