To the qualitative properties of solution of system equations not in divergence form of polytrophic filtration in variable density

In this paper, the properties of solutions for the nonlinear system equations not in divergence form:

||x| ^{n ∂u} _∂t = u ^γ1∇  |∇u| ^p−2∇u + |x| ⁿu ^q1 v ^q2 ,

|x| ^{n ∂v} _∂t = v ^γ2∇  |∇v| ^p−2∇v + |x| ⁿv ^q4 u ^q3,

are studied. In this work, we used method of nonlinear splitting, known previously for nonlinear parabolic equations, and systems of equations in divergence form, asymptotic theory and asymptotic methods based on different transformations. Asymptotic representation of self-similar solutions for the nonlinear parabolic system of equations not in divergence form is constructed. The property of finite speed propagation of distributions (FSPD) and the asymptotic behavior of the weak solutions were studied for the slow diffusive case.

1. Shigesada N., Kawasaki K., Teramoto E. Spatial segregation of interacting species. J. Theor. Biol., 1979, 79, P. 83–99.

2. Painter K. Continuous models for cell migration in tissues and applications to cell sorting via differential chemotaxis. Bull. Math. Biol., 2009, 71, P. 1117–1147.

3. Burger M., Schlake B., Wolfram W.T. Nonlinear Poisson-Nernst-Planck equations for ion flux through confined geometries. Nonlinearity , 2012, 25, P. 961–990.

4. Zhou W., Yao Z. Cauchy problem for a degenerate parabolic equation with non-divergence form. Acta Mathematica Scientia, 2010, 30B (5), P. 1679–1686.

5. Wang M. Some degenerate and quasilinear parabolic systems not in divergence form. J. Math. Anal. Appl., 2002, 274, P. 424–436.

6. Wang M., Wei Y. Blow-up properties for a degenerate parabolic system with nonlinear localized sources. J. Math. Anal. Appl., 2008, 343, P. 621–635.

7. Zhi-wen D., Li Zh. Global and Blow-Up Solutions for Nonlinear Degenerate Parabolic Systems with Crosswise-Diffusion. Journal of Mathematical Analysis and Applications, 2000, 244, P. 263–278.

8. Chunhua J., Jingxue Y. Self-similar solutions for a class of non-divergence form equations. Nonlinear Differ. Equ. Appl. Nodea, 2013, 20 (3), P. 873–893.

9. Raimbekov J.R. The Properties of the Solutions for Cauchy Problem of Nonlinear Parabolic Equations in Non-Divergent Form with Density. Journal of Siberian Federal University. Mathematics and Physics, 2015, 8 (2), P. 192–200.

10. Aripov M., Matyakubov A.S. To the properties of the solutions of a cross-diffusion parabolic system not in divergence form. Universal Journal of Computational Mathematics, 2017, 5 (1), P. 1–7.

11. Aripov M., Matyakubov A.S. Self-similar solutions of a cross-diffusion parabolic system with variable density: explicit estimates and asymptotic behaviour. Nanosystems: physics, chemistry, mathematics, 2017, 8 (1), P. 5–12.

12. Aripov M., Sadullaeva Sh.A. Qualitative Properties of Solutions of a Doubly Nonlinear Reaction-Diffusion System with a Source. Journal of Applied Mathematics and Physics, 2015, 3, P. 1090–1099.

13. Aripov M. Standard Equation’s Methods for Solutions to Nonlinear problems. Fan, Tashkent, 1988, 138 p. [14] Samarskii A.A., Galaktionov V.A., Kurdyumov S.P., Mikhailov A.P. Blow-up in Quasilinear Parabolic Equations. Walter de Grueter, Berlin, 1995, 4, P. 53.