Stretch flow of thin layers of Newtonian liquids: Fingering patterns and lifting forces
From MaRDI portal
Publication:3555150
DOI10.1063/1.1939927zbMath1187.76317OpenAlexW2088791230MaRDI QIDQ3555150
D. Derks, Michael J. Shelley, Anke Lindner
Publication date: 22 April 2010
Published in: Physics of Fluids (Search for Journal in Brave)
Full work available at URL: https://semanticscholar.org/paper/7e5913c5954a4c1bfaa128081d379f1440db71a2
pattern formationtwo-phase flowbubblesflow simulationflow instabilityflow through porous mediaconfined flow
Related Items (7)
Magnetic fluid labyrinthine instability in Hele-Shaw cell with time dependent gap ⋮ Computation of a Shrinking Interface in a Hele-Shaw Cell ⋮ Poisson growth ⋮ Nonlinear limiting dynamics of a shrinking interface in a Hele-Shaw cell ⋮ A REVIEW OF ONE-PHASE HELE-SHAW FLOWS AND A LEVEL-SET METHOD FOR NONSTANDARD CONFIGURATIONS ⋮ Numerical investigation of controlling interfacial instabilities in non-standard Hele-Shaw configurations ⋮ Fingering instabilities in adhesive failure
Cites Work
- Removing the stiffness from interfacial flows with surface tension
- The penetration of a fluid into a porous medium or Hele-Shaw cell containing a more viscous liquid
- On the measurement of “tack” for adhesives
- Two-phase displacement in Hele Shaw cells: theory
- The Penetration of a Finger into a Viscous Fluid in a Channel and Tube
- Hele - Shaw flow and pattern formation in a time-dependent gap
- Singularity formation in Hele–Shaw bubbles
- The primary and inverse instabilities of directional viscous fingering
This page was built for publication: Stretch flow of thin layers of Newtonian liquids: Fingering patterns and lifting forces
