Moscow, Moscow, Russian Federation
Moscow, Moscow, Russian Federation
Moscow, Moscow, Russian Federation
Moscow, Moscow, Russian Federation
UDK 629.4.027.51 обычной конструкции
BBK 392 Железнодорожный транспорт
The paper is devoted to modeling the stress-strain state of a car wheel in the case of its heat treatment. The calculation technique is based on the application of the finite element method for a specialized design diagram. The final elements have the form of rings of triangular cross-section. The initial equations are used on the basis of the theory of elasticity. The approximation of movements along the axis of rotation and along the radius is linear, in the circumferential direction it has the form of trigonometric series. Using the proposed technique, calculations of a wheel with two variants of rim hardening are implemented: as one annular strip on the rolling surface and with the use of two additional strips with an intermediate degree of hardening. The developed means of modeling can be used to develop methods and to select wheel hardening parameters.
wheel, car, hardening, method, movement, approximation, stress-strain state
1. Bate K, Wilson E. Numerical methods of analysis and the finite element method. Moscow: Stroyizdat; 1982.
2. Zenkevich O, Morgan K. Finite elements and approximation. Moscow: Mir; 1986.
3. Timoshenko SP. Course of elasticity theory. Kiev: Naukova Dumka; 1972.
4. Landau LD, Lifshits EM. Theoretical physics. Theory of elasticity: textbook. Moscow: Nauka; 1987.
5. Varvaka PM, Ryabova AF, editors. Handbook of elasticity theory (for civil engineers). Kiev: Budivelnik; 1971.
6. Demidov S.P. Theory of elasticity: textbook for universities. Moscow: Visshaya Shkola; 1979.
7. Lopatin AV, Morozov EV. Approximate analysis of deformation of orthotropic MFIC plates subjected to loading in the plane. International Journal of Mechanical Sciences. 2015;85:38-44.
8. Oniya M, Rowland-Lato EO, Ike Ch. Ch. The Ga-Lerkin-Vlasov variational method for the analysis of elastic deformation of rectangular plates SSCF and SSSSS. International Journal of Engineering Research and Technology. 2020;13(6):1137-1146.
9. Grigoriev PS, Ibodulloev SR, Poyanov VB. An approach to the assessment of critical temperatures of shallow loss of stability of a cylindrical shell [Internet]. Available from:uzjournals.edu.uz/btstu/vol2019/iss2/9 .
10. Zulkifli M, Basaruddin, Khairul and Abdul Rahim, Yuzairi and Afendi, Mohd and Panerselvan, Gurubaran and Ibrahim, Ishaq. Three-dimensional finite element analysis on a railway rail. IOP Conference Series: Materials Science and Engineering. 2018;429:012010.https://doi.org/10.1088/1757-899X/429/1/012010
11. Zulkifli M, Basaruddin, Khairul and Afendi, Mohd and Tan, Wei and Meng, Cheng. Modeling of finite elements on railway wheels at different loads. IOP Conference Series: Materials Science and Engineering. 2018;429:012002.https://doi.org/10.1088/1757-899X/429/1/012002 .
12. Ramanan LR, Krishna Kumar and R. Sriraman. Thermomechanical finite element analysis of a rail wheel. International Journal of Mechanical Sciences 1999;41(4-5):487-505. Dpi:https://doi.org/10.1016/S0020-7403(98)00078-2.