Abstract
While planar shock waves are known to be stable to small perturbations in the sense that the perturbation amplitude decays over time, it has also been suggested that plane propagating shocks can develop singularities in some derivative of their geometry (Whitham (1974) Linear and nonlinear waves. Wiley, New York) in a nonlinear, wave reinforcement process. We present a spectral-based analysis of the equations of geometrical shock dynamics that predicts the time to singularity formation in the profile of an initially perturbed planar shock for general shock Mach number. We find that following an initially sinusoidal perturbation, the shock shape remains analytic only up to a finite, critical time that is a monotonically decreasing function of the initial perturbation amplitude. At the critical time, the shock profile ceases to be analytic, corresponding physically to the incipient formation of a “shock-shock” or triple point. We present results for gas-dynamic shocks and discuss the potential for extension to shock dynamics of fast MHD shocks.
Original language | English (US) |
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Title of host publication | 31st International Symposium on Shock Waves 1 |
Publisher | Springer International Publishing |
Pages | 887-894 |
Number of pages | 8 |
ISBN (Print) | 9783319910192 |
DOIs | |
State | Published - Mar 22 2019 |
Bibliographical note
KAUST Repository Item: Exported on 2021-04-20Acknowledged KAUST grant number(s): URF/1/2162-01
Acknowledgements: This research was supported by the KAUST Office of Sponsored Research under award URF/1/2162-01. V. Wheatley holds an Australian Research Council Early Career Researcher Award (project number DE120102942).