Abstract
The passage of a shock wave through a layer of bubbly liquid is considered. An exact solution is constructed in the case of a normal screen with a pressure pulse in the form a semi-infinite step. The results of numerical modeling by a modified Godunov method are presented for long and short pressure pulses.
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Ya. I. Tseitlin, R. A. Gil’manov, and V. G. Nilov, Vzryvnoe Delo, No. 82/39, pp. 264–272 (1980).
A. A. Gubaidullin, A. I. Ivandaev, R. I. Nigmatulin et al., Itogi Nauki Tekh. Ser. Mekh. Zhidk. Gazov (VINITI, Moscow) 17, 160 (1982).
E. I. Timofeev, B. E. Gel’fand, A. G. Gumerov et al., Fiz. Goreniya Vzryva 21, 98 (1985).
B. R. Parkin, F. R. Gilmor, and G. A. Broud, in Underwater and Underground Explosions [in Russian], Mir, Moscow (1974), pp. 152–258.
B. E. Gel’fand, S. A. Gubin, and E. I. Timofeev, Zh. Prikl. Mekh. Tekh. Fiz., No. 1, pp. 118–123 (1982).
R. I. Nigmatulin, Dynamics of Multiphase Media, Part II [in Russian], Nauka, Moscow (1987), 360 pp.
V. S. Surov, Zh. Tekh. Fiz. 68(11), 12 (1998) [Tech. Phys. 43, 1280 (1998)].
V. S. Surov, Fiz. Goreniya Vzryva 33, 143 (1997).
Kh. A. Rakhmatulin, Prikl. Mat. Mekh. 33, 598 (1969).
V. S. Surov, Vestn. Chelyabinskogo Univ., No. 1, pp. 116–123 (1997).
P. Bhatnagar, Nonlinear Waves in One-Dimensional Dispersive Systems [Clarendon Press, Oxford (1979); Mir, Moscow (1983), 136 pp.].
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Zh. Tekh. Fiz. 69, 42–48 (January 1999)
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Surov, V.S. Interaction of a shock wave with a bubble screen. Tech. Phys. 44, 37–43 (1999). https://doi.org/10.1134/1.1259269
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DOI: https://doi.org/10.1134/1.1259269