Velocity and scaling of collapsing Euler vortices
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Publication:3555173
DOI10.1063/1.1905183zbMath1187.76264OpenAlexW2060667291MaRDI QIDQ3555173
Publication date: 22 April 2010
Published in: Physics of Fluids (Search for Journal in Brave)
Full work available at URL: https://semanticscholar.org/paper/3c3d6760769be7530cdb53847c5cd3735d998e1e
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Cites Work
- Remarks on the breakdown of smooth solutions for the 3-D Euler equations
- Remarks on a paper by J. T. Beale, T. Kato, and A. Majda (Remarks on the breakdown of smooth solutions for the 3-dimensional Euler equations)
- A quaternionic structure in the three-dimensional Euler and ideal magneto-hydrodynamics equations
- Symmetry and the hydrodynamic blow-up problem
- Numerical study of singularity formation in a class of Euler and Navier–Stokes flows
- Vortex dynamics and the existence of solutions to the Navier–Stokes equations
- Vorticity alignment results for the three-dimensional Euler and Navier - Stokes equations
- Evidence for a singularity of the three-dimensional, incompressible Euler equations
- Geometric Statistics in Turbulence
- Formation of strong fronts in the 2-D quasigeostrophic thermal active scalar
- Cover illustration: vortex structure of Euler collapse
- Geometric Properties and Nonblowup of 3D Incompressible Euler Flow
- Scalars convected by a two-dimensional incompressible flow
- Geometric constraints on potentially
- Inviscid and inviscid-limit behavior of a surface quasigeostrophic flow
- Limiting case of the Sobolev inequality in BMO, with application to the Euler equations
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