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Instability of Strongly Nonlinear Waves in Vortex Flows
A. Kribus
Weizmann Institute of Science
Cornell University
Research output
:
Contribution to journal
›
Article
›
peer-review
14
Scopus citations
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Dive into the research topics of 'Instability of Strongly Nonlinear Waves in Vortex Flows'. Together they form a unique fingerprint.
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Keyphrases
Three-dimensional (3D)
100%
Wave Amplitude
100%
Linear Stability
100%
Vortex Breakdown
100%
Strongly Nonlinear Waves
100%
Vortex Flow
100%
Solitary Waves
50%
Viscosity
50%
Reynolds number
50%
Vortex
50%
Non-axisymmetric
50%
Strongly Nonlinear
50%
Eigenvector
50%
Non-separable
50%
OpenFlow
50%
Stability Problem
50%
Linearly Stable
50%
Weakly Nonlinear
50%
Bending Mode
50%
Perturbation Problem
50%
Critical Layers
50%
Critical Wave
50%
Cnoidal Waves
50%
Axisymmetric Bending
50%
Axisymmetric Flow
50%
Engineering
Vortex
100%
Vortex Flow
100%
Axisymmetric
66%
Streamlines
66%
Linearized Stability
66%
Solitary Wave
33%
Reynolds' Number
33%
Fluid Viscosity
33%
Eigenvector
33%
Axisymmetric Flow
33%
Physics
Nonlinear Wave
100%
Vortex
100%
Vortex Breakdown
100%
Solitary Wave
50%
Reynolds Number
50%
Axisymmetric Flow
50%
Cnoidal Wave
50%