SYSTEM OF EQUATIONS OF COUPLED DYNAMIC PROBLEMS OF A VISCOELASTIC SHELL IN A TEMPERATURE FIELD
Main Article Content
Abstract
At in the present work, a mathematical model of coupled dynamic problems of a viscoelastic shell located in a temperature field is obtained.
Article Details
This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.
References
Ambartsumyan S.A. Theory of anisotropic shells. Moscow: Fizmatgiz . 1961. 384 p.
Ogibalov P.M., Suvorova Yu.V. Mechanics of reinforced plastics. Moscow State University. 1965.
Volmir A.S. Nonlinear dynamics of plates and shells. M.: Science. 1972. 432 p.
Ogibalov P.M., Gribanov V.F. Thermal stability of plates and shells. Moscow State University. 1968. 520 p.
Kovalenko A.D. Thermoelasticity . Minsk: Vyscha school. 1975. 216 p.
Lykov A.V. Theory of Thermal Conductivity . Minsk. Vyscha school. 1967. 599 p.
Carslow G., Eger D. Thermal conductivity of solids. M.: Science. 1964. 486 p.
[eight]. Badalov F.B., Eshmatov Kh., Akbarov U.Y. Stability of a viscoelastic orthotropic plate under dynamic loading ./ / Tr. 15th Conf . on the theory of plates and shells. Kazan. 1990. p. 372-378.
Karnaukhov V.G., Kirichok I.F. Related problems of the theory of viscoelastic plates and shells. Kiev, Naukova Dumka. 1986. 224 p.
Bolotin V.V. Dynamic problems of thermoelasticity for plates and shells in the presence of radiation//Tr. conf . on the theory of plates and shells. Kazan. 1961.
Ilyushin O., Pobedrya B.E. Fundamentals of the Mathematical Theory of Thermoviscoelasticity . M.: Science. 1970. 280 p.
Mamazhonov , M., and Hosiyathon Botirovna Mamadaliev . "Formulation and study of some boundary value problems for a third-order parabolic -hyperbolic type equation of the form ∂∂x( Lu )=0 in a pentagonal region." Vestnik KRAUNTS. Physical and Mathematical Sciences 1 (12 (2016): 32-40.
Mamazhonov, M., & Shermatova, K. M. (2017). ON A BOUNDARY-VALUE PROBLEM FOR A THIRD-ORDER PARABOLIC-HYPERBOLIC EQUATION IN A CONCAVE HEXAGONAL DOMAIN. Bulletin KRASEC. Physical and Mathematical Sciences, 16(1), 11-16.
Mamajonov , M ., & Shermatova , H . M . (2017). On a boundary value problem for a third-order equation of parabolic -hyperbolic type in a concave hexagonal region. Vestnik KRAUNTS. Physical and Mathematical Sciences , (1 (17), 14-21.
Mamajonov , Mirza, and Hylolahon Mirzaevna Shermatova . "On a boundary value problem for a third-order parabolic -hyperbolic type equation in a concave hexagonal region." Vestnik KRAUNTS. Physics and Mathematics 1 (17 (2017): 14-21.
Mamazhonov, M., and Kh B. Mamadalieva. "STATEMENT AND STUDY OF SOME BOUNDARY VALUE PROBLEMS FOR THIRD ORDER PARABOLIC-HYPERBOLIC EQUATION OF TYPE∂(Lu)/∂ x= 0 IN A PENTAGONAL DOMAIN." Bulletin KRASEC. Physical and Mathematical Sciences 12.1 (2016): 27-34.
Mamajonov , Mirza , and Sanzharbek Mirzaevich Mamazhonov . "Statement and method of investigation of some boundary value problems for one class of fourth-order equations of parabolic -hyperbolic type." Vestnik KRAUNTS. Physical and Mathematical Sciences 1 (8) (2014): 14-19.
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.
Sarymsakov, Tashmukhamed Alievich, S. N. Nasirov, and Dzhavvat Khadzhiev. "Description of the ideals of a class of rings." Doklady Akademii Nauk. Vol. 225. No. 5. Russian Academy of Sciences, 1975.
Nosirovich , Nosirov Sobir, and Aroev Dilshod Davronovich . "On Non-Associative Algebra And Its Properties."
Sarymsakov , TA, SN Nasirov , and D. Khadzhiev . "Soviet Math. Dokl . 16." English translation (1975).
Nosirovich , Nosirov Sobirjon , Aroyev Delighted Davronovich , and Sobirov Avazbek Abdurashid son _ "SOME PROPERTIES OF THE DISTANCE BETWEEN TWO POINTS." Journal of Ethics and Diversity in International Communication 1.1 (2021): 54-56.
Nosirov, C. Ph-M. Sci SN, D. D. Aroev, and A. A. Sobirov. "SOME PROPERTIES OF THE DISTANCE BETWEEN TWO POINTS." E-Conference Globe. 2021.
Formanov, Sh K., and Sh Jurayev. "On Transient Phenomena in Branching Random Processes with Discrete Time." Lobachevskii Journal of Mathematics 42.12 (2021): 2777-2784.
Khusanbaev , Ya . M ., and X . K. _ Zhumakulov . "On the convergence of almost critical branching processes with immigration to a deterministic process." O'ZBEKISTON MATEMATIKA JURNALI (2017): 142.