Analysis of the Class of Hydrodynamic Systems

Authors

  • Olga Pavlovna Matveeva Author
  • Tamara Gennadyevna Sukacheva Author

Abstract

The solvability of the Cauchy–Dirichlet problem for the generalized homogeneous model of the dynamics of the high-order viscoelastic incompressible Kelvin–Voigt fluid is considered. In the study, the theory of semilinear equations of the Sobolev type was used. The indicated problem for the system of differential equations in partial derivatives is reduced to the Cauchy problem for the indicated type of the equation. The theorem on the existence of the unique solution of this problem, which is a quasi-stationary trajectory, is proved, and its phase space is described.

Author Biographies

  • Olga Pavlovna Matveeva
    Cand. Sc. (Physics and Mathematics), Associate Professor, Algebra and Geometry Department
  • Tamara Gennadyevna Sukacheva
    Dr. Sc. (Physics and Mathematics), Professor, Algebra and Geometry Department, Novgorod State University, Velikiy Novgorod; Leading Researcher, Laboratory of Nonclassical Sobolev Type Equations, South Ural State University (NRU), Chelyabins

Published

2022-07-29

Issue

Vol. 14 No. 3 (2022)

Section

Mathematics