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Mechanics
Homentropic model of spherical shock wave reflection from the center of convergence
I. A. Chernov Saratov State University, Chair of Mechanics Computational Experiment
Abstract:
An implosive shock wave on a based gas the particular case of motion with zero pressure, but with variable density is discussed. The density is described by degree relation to distance up to a point of focusing of a shock wave. Such selection of an exponent in this relation that the entropy in all area of flow after passage of a shock wave was a constant (homentropic case) is offered. Thus qualitatively different behaviour of temperature in comparison with classical case Guderley–Landau–Stanjukovich is obtained.
Key words:
one-dimensional flows, self-similar flows, converging shock wave, homentropic model.
Citation:
I. A. Chernov, “Homentropic model of spherical shock wave reflection from the center of convergence”, Izv. Saratov Univ. Math. Mech. Inform., 10:3 (2010), 70–76
Linking options:
https://www.mathnet.ru/eng/isu178 https://www.mathnet.ru/eng/isu/v10/i3/p70
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