Semi-analytical implicit direct time integration method for 1-D gas dynamic problem
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Дата
2023
Автори
Науковий керівник
Назва журналу
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Видавець
Igor Sikorsky Kyiv Polytechnic Institute
Анотація
Sharp wave treatment for 1-D gas dynamic problem is still a challenge for modern numerical methods. They often require too many space and time steps, produce spurious oscillation of solution, exhibit a strong numerical dissipation or divergence of results.
This paper is further extension of authors’ idea of employment the analytical solution for space coordinate, where time step is a parameter which used in the space solution. Its peculiarity consists in development of additional linearization procedure of dependence between the pressure and density. It is performed in premise that actual pressure for each space element is close to the basic pressure, attained at previous moment of time. The efficiency of method is tested on the very popular task of Sod, where two different ideal gases in a tube are separated by diaphragm, which is suddenly broken. The problem considered in Lagrangian coordinates formulation. The results obtained show the very good method efficiency, which requires the essentially lesser time and space steps, leads to no spurious oscillation and give consistent and predictable results with respect to meshing. The accuracy of method is mostly controlled by time step, which should be larger than clearly stated theoretical lower limit. Other advantage of method is that it can calculate the process to any desired time moment, and space meshing can be variable in time and space and can be easily adapted during the process of calculation.
Опис
Ключові слова
transfer matrix method, Lagrangian formulation, implicit method, Sod’s task, stability, ideal gas, осесиметрична оболонка, розподілене навантаження, концентрована сила, метод Нав’є, метод Бубнова Гальоркіна, множина експоненціальних функцій
Бібліографічний опис
Orynyak, I. Semi-analytical implicit direct time integration method for 1-D gas dynamic problem / Orynyak I., Kostyushko I., Mazuryk R. // Mechanics and Advanced Technologies. – 2023. – No. 1. – С. 91-99. – Бібліогр.: 27 назв.