Liouville comparison theory for breakdown of Euler-Arnold equations
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Publication:6601853
DOI10.1016/j.jde.2024.07.009zbMATH Open1547.35513MaRDI QIDQ6601853
Stephen C. Preston, Justin Valletta, Martin Bauer
Publication date: 11 September 2024
Published in: Journal of Differential Equations (Search for Journal in Brave)
PDEs in connection with fluid mechanics (35Q35) KdV equations (Korteweg-de Vries equations) (35Q53) Homotopy and topological questions for infinite-dimensional manifolds (58B05) Methods of ordinary differential equations applied to PDEs (35A24) PDEs in connection with geophysics (35Q86) Euler equations (35Q31) Liouville theorems and Phragmén-Lindelöf theorems in context of PDEs (35B53)
Cites Work
- Unnamed Item
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- The SQG equation as a geodesic equation
- Geometry of diffeomorphism groups, complete integrability and geometric statistics
- Blow-up of solutions to the generalized inviscid Proudman-Johnson equation
- On Euler's equation and `EPDiff'
- Homogeneous Sobolev metric of order one on diffeomorphism groups on real line
- Local well-posedness of the Camassa-Holm equation on the real line
- Blow-up, zero \(\alpha\) limit and the Liouville type theorem for the Euler-poincaré equations
- On a one-dimensional model for the three-dimensional vorticity equation
- Geometric investigations of a vorticity model equation
- A sign-changing Liouville equation
- Geodesic equations on diffeomorphism groups
- Some inequalities for modified Bessel functions
- Korteweg - de Vries suoerequation as an Euler equation
- Manifolds, tensor analysis, and applications.
- The Euler-Poincaré equations and semidirect products with applications to continuum theories
- Wave breaking for nonlinear nonlocal shallow water equations
- A shallow water equation as a geodesic flow on the Bott-Virasoro group
- Topological methods in hydrodynamics
- Euler-Arnold equations and Teichmüller theory
- Classical solutions of the periodic Camassa-Holm equation.
- The geometry of a vorticity model equation
- Well-posedness of the EPDiff equation with a pseudo-differential inertia operator
- Geodesic completeness of the \(H^{3/2}\) metric on \(\text{Diff}(S^1)\)
- Local and global well-posedness of the fractional order EPDiff equation on \(\mathbb{R}^d\)
- On the global well-posedness of the inviscid generalized Proudman-Johnson equation using flow map arguments
- Geodesic completeness for Sobolev \(H^{s}\)-metrics on the diffeomorphism group of the circle
- The geometry of the universal Teichmüller space and the Euler-Weil-Petersson equation
- Generalized Hunter-Saxton equations, optimal information transport, and factorization of diffeomorphisms
- On the Euler-Poincaré equation with non-zero dispersion
- The Hunter-Saxton equation describes the geodesic flow on a sphere
- Right-invariant Sobolev metrics of fractional order on the diffeomorphism group of the circle
- Groups of diffeomorphisms and the motion of an incompressible fluid
- Computing large deformation metric mappings via geodesic flows of diffeomorphisms
- On completeness of groups of diffeomorphisms
- Fredholm properties of Riemannian exponential maps on diffeomorphism groups
- Statistical Shape Analysis, with Applications in R
- On existence of extremal solutions of differential equations in Banach spaces
- Existence and comparison theorems for differential equations in Banach spaces
- A Concise Presentation of the Euler Equations of Hydrodynamics
- On a generalization of the Constantin–Lax–Majda equation
- Dynamics of Director Fields
- On the geometric approach to the motion of inertial mechanical systems
- An integrable shallow water equation with peaked solitons
- On the Structure of Solutions to the Periodic Hunter--Saxton Equation
- The Camassa–Holm equation as a geodesic flow on the diffeomorphism group
- A Partial Differential Equation Arising in a 1D Model for the 3D Vorticity Equation
- A simple one‐dimensional model for the three‐dimensional vorticity equation
- Local Geometry of Deformable Templates
- Shapes and diffeomorphisms
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