Unstable Fingering Patterns of Hele-Shaw Flows as a Dispersionless Limit of the Kortweg–de Vries Hierarchy

Authors :: Razvan Teodorescu
Anton Zabrodin
Paul Wiegmann
Source :: Physical Review Letters. 95
Publication Year :: 2005
Publisher :: American Physical Society (APS), 2005.
Abstract: We show that unstable fingering patterns of two-dimensional flows of viscous fluids with open boundary are described by a dispersionless limit of the Korteweg-de Vries hierarchy. In this framework, the fingering instability is linked to a known instability leading to regularized shock solutions for nonlinear waves, in dispersive media. The integrable structure of the flow suggests a dispersive regularization of the finite-time singularities.

Subjects :: Physics
Darcy's law
General Physics and Astronomy
01 natural sciences
Instability
010305 fluids & plasmas
Physics::Fluid Dynamics
Viscous fingering
Nonlinear system
Nonlinear Sciences::Exactly Solvable and Integrable Systems
Hele-Shaw flow
Singularity
Classical mechanics
0103 physical sciences
Gravitational singularity
010306 general physics
Korteweg–de Vries equation
Nonlinear Sciences::Pattern Formation and Solitons

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