STATEMENT AND INVESTIGATION OF ONE BOUNDARY PROBLEM FOR ONE PARABOLIC-HYPERBOLIC EQUATION OF THE THIRD ORDER IN A PENTAGONAL DOMAIN WITH THREE LINES OF TYPE CHANGE
Main Article Content
Abstract
In the present work, we pose and study one boundary value problem for a parabolic- hyperbolic third-order equations of the form
Article Details
This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.
References
Dzhuraev T.D., Sopuev A., Mamazhanov M. Boundary value problems for equations of parabolic-hyperbolic type. Tashkent, Fan, 1986, 220 p.
Dzhuraev T.D., Mamazhanov M. Boundary Value Problems for a Class of Mixed Type Fourth-Order Equations. Differential Equations, 1986, v. 22 , No. 1, pp. 25-31.
Takhirov Zh.O. Boundary Value Problems for a Mixed Parabolic-Hyperbolic Equation with Known and Unknown Separation Lines. Abstract of Ph.D. thesis. Tashkent, 1988.
Berdyshev A.S. Boundary Value Problems and Their Spectral Properties for an Equation of Mixed Parabolic-Hyperbolic and Mixed-Composite Types. – Almaty, 2015, 224
Mamazhanov M. , Mamazhonov S.M. Statement and method of investigation of some boundary value problems for one class of fourth-order equations of parabolic-hyperbolic type. Vestnik KRAUNTS. Phys-Math. science. 2014. No. 1 (8). pp.14-19.
Mamazhanov M. , Shermatova H.M., Mukhtorova T.N. On a Boundary Value Problem for a Third-Order Parabolic-Hyperbolic Equation in a Concave Hexagonal Domain . XIII Belarusian Mathematical Conference: Proceedings of the International Scientific Conference, Minsk, November 22–25, 2021: in 2 hours / comp. V. V. Lepin; National Academy of Sciences of Belarus, Institute of Mathematics, Belarusian State University. - Minsk: Belarusian Science, 2021. - Part 1. - 135 p.
Mamazhanov M. , Shermatova H.M. On some boundary value problems for a class of third-order equations of parabolic-hyperbolic type in a triangular domain with three lines of type change. Namangan Davlat university and ilmiy ahborotnomashi. Namangan, 2022, 2-son, 41-51 betlar.
Abdikarimov, Rustamxon A., Mukhsin M. Mansurov, and Ummatali Y. Akbarov. "Numerical study of a flutter of a viscoelastic rigidly clamped rod with regard to the physical and aerodynamic nonlinearities." VESTNIK RGGU 3 (2019): 95.
Abdikarimov, Rustamkhon A., Mukhsin M. Mansurov, and Ummatali Y. Akbarov. "Numerical study of the flutter of a viscoelastic rigidly clamped rod, taking into account the physical and aerodynamic nonlinearities." Bulletin of the Russian State University for the Humanities. Series: Informatics. Information Security. Mathematics 3 (2019): 94-107.
Abdikarimov, Rustamxon A., Mukhsin M. Mansurov, and Ummatali Y. Akbarov. "Numerical study of a flutter of a viscoelastic rigidly clamped rod with regard to the physical and aerodynamic nonlinearities." VESTNIK RGGU 3 (2019): 95.
Abdikarimov, Rustamxon A., Mukhsin M. Mansurov, and Ummatali Y. Akbarov. "Numerical study of a flutter of a viscoelastic rigidly clamped rod with regard to the physical and aerodynamic nonlinearities." VESTNIK RSUH 3 (2019): 95.
Akbarov, U. Y., and F. B. Badalov. "Eshmatov X. Stability of viscoelastic rods under dynamic loading." Appl. fur. and those. 4 (1992): 20-22.
Aroev, Dilshod Davronovich. "ON OPTIMIZATION OF PARAMETERS OF THE OBJECT CONTROL FUNCTION DESCRIBEED BY A SYSTEM OF DIFFERENTIAL-DIFFERENCE EQUATIONS." Scientific research of young scientists . 2020.
Aroev, D. D. "ON CHECKING THE STABILITY OF MOVEMENT OF INDUSTRIAL ROBOTS THAT BELONG TO THE CLASS OF COORDINATE DELAY." The current stage of world scientific development (2019): 3-7.
Khusanbaev, Ya. M., and Kh. K. Zhumakulov. "On the convergence of almost critical branching processes with immigration to a deterministic process." O'ZBEKISTON MATEMATIKA JURNALI (2017): 142.