Email this article Theoretical study of stability of nodal completely conservative difference schemes with viscous filling for gas dynamics equations in Euler variables
- Authors: Ladonkina M.E.1,2, Poveshenko Y.A.3,2, Ragimli O.R.2, Zhang H.2
-
Affiliations:
- Keldysh Institute of Applied Mathematics of Russian Academy of Sciences
- Moscow Institute of Physics and Technology
- Keldysh Institute of Applied Mathematics of RAS
- Issue: Vol 24, No 3 (2022)
- Pages: 317-330
- Section: Applied mathematics and mechanics
- Published: 24.08.2022
- URL: https://journals.rcsi.science/2079-6900/article/view/366390
- DOI: https://doi.org/10.15507/2079-6900.24.202203.317-330
- ID: 366390
Cite item
Full Text
Abstract
For the equations of gas dynamics in Eulerian variables, a family of twolayer time-fully conservative difference schemes (FCDS) with space-profiled time weights is investigated. Nodal schemes and a class of divergent adaptive viscosities for FCDS with spacetime profiled weights connected with variable masses of moving nodal particles of the medium are developed. Considerable attention is paid to the methods of constructing regularized flows of mass, momentum and internal energy that preserve the properties of fully conservative difference schemes of this class, to the analysis of their stability and to the possibility of their use on uneven grids. The effective preservation of the internal energy balance in this class of divergent difference schemes is ensured by the absence of constantly operating sources of difference origin that produce “computational” entropy (including entropy production on the singular features of the solution). Developed schemes may be used in modelling of hightemperature flows in temperature-disequilibrium media, for example, if it is necessary to take into account the electron-ion relaxation of temperature in a short-living plasma under conditions of intense energy input.
About the authors
Marina E. Ladonkina
Keldysh Institute of Applied Mathematics of Russian Academy of Sciences; Moscow Institute of Physics and Technology
Email: ladonkina@imamod.ru
ORCID iD: 0000-0001-7596-1672
PhD (Physics and Mathematics), Senior Researcher , Keldysh Institute of Applied Mathematics of Russian Academy of Sciences
Russian Federation, 4 Miusskaya Sq., Moscow 125047, RussiaYuri A. Poveshenko
Keldysh Institute of Applied Mathematics of RAS; Moscow Institute of Physics and Technology
Email: hecon@mail.ru
ORCID iD: 0000-0001-9211-9057
Dr.Sci. (Physics and Mathematics), Leading Researcher, Keldysh Institute of Applied Mathematics of Russian Academy of Sciences
Russian Federation, 4 Miusskaya Sq., Moscow 125047, RussiaOrkhan R. Ragimli
Moscow Institute of Physics and Technology
Email: orxan@reximli.info
ORCID iD: 0000-0001-7257-1660
Postgraduate Student
Russian Federation, 9 Institutskiy Pereulok St., Dolgoprudny 141701, RussiaHaochen Zhang
Moscow Institute of Physics and Technology
Author for correspondence.
Email: chzhan.h@phystech.edu
ORCID iD: 0000-0003-1378-1777
Postgraduate Student
Russian Federation, 9 Institutskiy Pereulok St., Dolgoprudny 141701, RussiaReferences
- A. A. Samarsky, Yu. P. Popov, Difference methods for solving problems of gas dynamics, Nauka Publ., Moscow, 1980 (In Russ.), 352 p.
- Yu. P. Popov, A. A. Samarsky, “Completely conservative difference schemes”, Computational Mathematics and Mathematical Physics, 9:4 (1969), 953–958 (In Russ.).
- A. V. Kuzmin, V. L. Makarov, “About one construction algorithm in full of conservative difference schemes”, Computational Mathematics and Mathematical Physics., 22:1 (1982), 123–132 (In Russ.).
- A. V. Kuzmin, V. L. Makarov, G. V. Meladze, “On one completely conservative difference scheme for the equation of gas dynamics in Euler variables”, Computational Mathematics and Mathematical Physics, 20:1 (1980), 171–181 (In Russ.).
- V. M. Goloviznin, I. V. Krayushkin, M. A. Ryazanov, A. A. Samarsky, “Twodimensional completely conservative difference schemes of gas dynamics with spaced velocities”, Preprints of the KIAM, 105 (1983) (In Russ.).
- A. V. Koldoba, Yu. A. Poveshchenko, Yu. P. Popov, “Fully double layered conservative difference schemes for gas dynamics equations in Euler variables”, Computational Mathematics and Mathematical Physics, 27:5 (1987), 779–784 (In Russ.).
- A. V. Koldoba, O. A. Kuznetsov, Yu. A. Poveshchenko, Yu. P. Popov, “On one approach to the calculation of problems of gas dynamics with a variable mass of a quasiparticle”, Preprints of the KIAM, 57 (1985) (In Russ.).
- A. V. Koldoba, Yu. A. Poveshchenko, “Completely conservative difference schemes for gas dynamics equations in the presence of mass sources”, Preprints of the KIAM, 160 (1982) (In Russ.).
- A. A. Samarskii, A. V. Koldobav, Yu. A. Poveshchenko, V. F. Tishkin, A. P. Favorskii, Difference schemes on irregular grids, Criteria Publ., Minsk, 1996 (In Russ.), 275 p.
- A. V. Koldoba, Yu. A. Poveshchenko, I. V. Gasilova, E. Yu. Dorofeeva, “Difference schemes of the method of support operators for equations of theories of elasticity”, Math. Modeling, 24:12 (2012), 86–96 (In Russ.).
- Yu. A. Poveshchenko, V. O. Podryga, Yu. S. Sharova, “Integrally consistent methods for calculating self-gravitating and magnetohydrodynamic phenomena”, Preprints of the KIAM, 160 (2018) (In Russ.).
- Yu. V. Popov, I. V. Fryazinov, Adaptive artificial viscosity method numerical solution of equations of gas dynamics, Krasand Publ., Moscow, 2014 (In Russ.), 288 p.
- Yu. A. Poveshchenko, M. E. Ladonkina, V. O. Podryga, O. R. Rahimly, Yu. S. Sharova, “On a two-layer completely conservative difference scheme of gas dynamics in Eulerian variables with adaptive regularization of solution”, Keldysh Institute Preprints, 14 (2019) (In Russ.), 23 p.
- O. Rahimly, V. Podryga, Y. Poveshchenko, P. Rahimly, Y. Sharova, “Two-layer completely conservative difference scheme of gas dynamics in Eulerian variables with adaptive regularization of solution”, Lecture Notes in Computer Science, 11958 LNCS (2020), 618–625. DOI: https://doi.org/10.1007/978-3-030-41032-2_71
- M. E. Ladonkina, Yu. A. Poveschenko, O. R. Rahimly, H. Zhang, “Theoretical analysis of fully conservative difference schemes with adaptive viscosity”, Zhurnal SVMO, 23:4 (2021), 412–423 (In Russ.). DOI: https://doi.org/10.15507/2079-6900.23.202104.412-423
Supplementary files
