Symmetry transformations of an ideal steady fluid flow determined by a potential function
DOI10.1063/1.4965224zbMath1349.76027OpenAlexW2538392177MaRDI QIDQ2832734
A. G. Megrabov, Martin Oberlack, Vladimir N. Grebenev, Alexander N. Grishkov
Publication date: 14 November 2016
Published in: Journal of Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1063/1.4965224
Applications of Lie (super)algebras to physics, etc. (17B81) Jets and cavities, cavitation, free-streamline theory, water-entry problems, airfoil and hydrofoil theory, sloshing (76B10) Symmetry analysis, Lie group and Lie algebra methods applied to problems in fluid mechanics (76M60) Euler equations (35Q31)
Cites Work
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- The dual stream function representation of an ideal steady fluid flow and its local geometric structure
- Differential invariant algebras of Lie pseudo-groups
- Generating differential invariants
- A mathematical introduction to conformal field theory. Based on a series of lectures given at the Mathematisches Institut der Universität Hamburg
- A pair of stream functions for three-dimensional vortex flows
- Topological methods in hydrodynamics
- The Pick invariant in equiaffine differential geometry
- Representation of divergence-free vector fields
- Mixed Lagrangian–Eulerian description of vortical flows for ideal and viscous fluids
- Isometric transformations of a surface inducing conformal maps of the surface onto itself
- A vortex filament moving without change of form
- A soliton on a vortex filament
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