Computational experiment for a class of mathematical models of magnetohydrodynamics

A. O. Kondyukov; T. G. Sukacheva; S. I. Kadchenko; L. S. Ryazanova

Authors

A. O. Kondyukov Author
T. G. Sukacheva Author
S. I. Kadchenko Author
L. S. Ryazanova Author

Abstract

The first initial-boundary value problem for the system modelling the motion of the incompressible viscoelastic Kelvin - Voigt fluid in the magnetic field of the Earth is investigated considering that the fluid is under external influence. The problem is studied under the assumption that the fluid is under different external influences depending not only on the coordinates of the point in space but on time too. In the framework of the theory of semi-linear Sobolev type equations the theorem of existence and uniqueness of the solution of the stated problem is proved.The solution itself is a quasi-stationary semi-trajectory. The description of the problem's extended phase space is obtained.The results of the computainal experiment are presented.

Author Biographies

A. O. Kondyukov

PhD student
T. G. Sukacheva

Grand PhD in Physico-mathematical sciences
S. I. Kadchenko

Grand PhD in Physico-mathematical sciences
L. S. Ryazanova

PhD in Pedagogic sciences

Computational Experiment for a Class of Mathematical Models of Magnetohydrodynamics

Authors

Abstract

Author Biographies

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