Phase space of a model of magnetohydrodynamics
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Publication:2515254
DOI10.1134/S0012266115040072zbMath1320.35293MaRDI QIDQ2515254
A. O. Kondyukov, Tamara G. Sukacheva
Publication date: 31 July 2015
Published in: Differential Equations (Search for Journal in Brave)
PDEs in connection with fluid mechanics (35Q35) Viscoelastic fluids (76A10) Magnetohydrodynamics and electrohydrodynamics (76W05)
Related Items (5)
Oskolkov Models and Sobolev-Type Equations ⋮ Semilinear Models of Sobolev Type. Non-Uniqueness of Solution to the Showalter-Sidorov Problem ⋮ Phase space of a model of magnetohydrodynamics of nonzero order ⋮ Numerical Study of a Flow of Viscoelastic Fluid of Kelvin - Voigt Having Zero Order in a Magnetic Field ⋮ A Non-Stationary Model of the Incompressible Viscoelastic Kelvin-Voigt Fluid of Non-Zero Order in the Magnetic Field of the Earth
Cites Work
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- Initial-boundary value problems for the equations of motion of Kelvin- Voigt fluids and Oldroyd fluids
- Geometric theory of semilinear parabolic equations
- Cauchy problem for a class of semilinear equations of Sobolev type
- The Hopf bifurcation and its applications. With contributions by P. Chernoff, G. Childs, S. Chow, J. R. Dorroh, J. Guckenheimer, L. Howard, N. Kopell, O. Lanford, J. Mallet-Paret, G. Oster, O. Ruiz, S. Schecter, D. Schmidt, and S. Smale
- On the differential system governing flows in magnetic field with data in \(L^p\)
- Some nonexistence and instability theorems for solutions of formally parabolic equations of the form \(Pu_t=-Au+ {\mathfrak F} (u)\)
- Linear Sobolev type equations and degenerate semigroups of operators
- QUASISTATIONARY TRAJECTORIES OF SEMILINEAR DYNAMICAL EQUATIONS OF SOBOLEV TYPE
- Asymptotic expansions for a model with distinguished “fast” and “slow” variables, described by a system of singularly perturbed stochastic differential equations
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