Study of a Model Equation in Detonation Theory
Author(s)
Faria, Luiz M.; Kasimov, Aslan R.; Rosales, Rodolfo R.
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Here we analyze properties of an equation that we previously proposed to model the dynamics of unstable detonation waves [A. R. Kasimov, L. M. Faria, and R. R. Rosales, Model for shock wave chaos, Phys. Rev. Lett., 110 (2013), 104104]. The equation is $ u_{t}+\tfrac{1}{2}\left(u^{2}-uu\left(0^{-},t\right)\right)_{x}=f\left(x,u\left(0^{-},t\right)\right),\;x\le0,\; t>0. $ It describes a detonation shock at $x=0$ with the reaction zone in $x<0$. We investigate the nature of the steady-state solutions of this nonlocal hyperbolic balance law, the linear stability of these solutions, and the nonlinear dynamics. We establish the existence of instability followed by a cascade of period-doubling bifurcations leading to chaos.
Date issued
2014-04Department
Massachusetts Institute of Technology. Department of MathematicsJournal
SIAM Journal on Applied Mathematics
Publisher
Society for Industrial and Applied Mathematics
Citation
Faria, Luiz M., Aslan R. Kasimov, and Rodolfo R. Rosales. “Study of a Model Equation in Detonation Theory.” SIAM Journal on Applied Mathematics 74, no. 2 (April 24, 2014): 547–570. © 2014, Society for Industrial and Applied Mathematics.
Version: Final published version
ISSN
0036-1399
1095-712X