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1. Haas J. F., Sturtevant B. Interaction of weak shock waves with cylindrical and spherical inhomogeneities // J. Fluid Mechanics. 1987. V. 181. P. 41–76.
2. Samtaney R., Zabusky N. J. Circulation deposition on shockaccelerated planar and curved density-stratified interfaces: Models and scaling laws // J. Fluid Mechanics. 1994. V. 269. P. 45–78.
3. Picone J. M., Boris J. P. Vorticity generation by shock propagation through bubbles in a gas // J. Fluid Mechanics. 1988. V. 189. P. 23–51.
4. Ranjan D., Oakley J., Bonazza R. Shock-bubble interactions // Annual Review of Fl. Mech. 2011. V. 43. № 1. P. 117–140.
5. Haehn N., Ranjan D., Weber C., Oakley J., Rothamer D., Bonazza R. Reacting shock bubble interaction // Combustion and Flame. 2012. V. 159. № 3. P. 1339–1350.
6. Diegelmann F., Hickel S., Adams N. A. Three-dimensional reacting shock-bubble interaction // Combustion and Flame. 2017. V. 181. P. 300–314.
7. Ray J., Samtaney R., Zabusky N. J. Shock interactions with heavy gaseous elliptic cylinders: Two leeward-side shock competition modes and a heuristic model for interfacial circulation deposition at early times // Phys. Fluids. 2000. V. 12. № 3. P. 707–716.
8. Georgievskiy P. Y., Levin V. A., Sutyrin O. G. Interaction of a shock with elliptical gas bubbles // Shock Waves. 2015. V. 25. № 4. P. 357–369.
9. Zhang W., Zou L., Zheng X., Wang B. Numerical study on the interaction of a weak shock wave with an elliptic gas cylinder // Shock Waves. 2018. https://doi.org/10.1007/s00193-018-0828-y. P. 1–12.
10. Liu X. D., Osher S., Chan T. Weighted essentially non-oscillatory schemes // J. Comput. Phys. 1994. V. 115. № 1. P. 200–212.
11. Sanders R., Morano E., Druguet M. C. Multidimensional dissipation for upwind schemes: Stability and applications to gas dynamics // J. Comput. Phys. 1998. V. 145. № 2. P. 511–537.