D'yakov-Kontorovich instability of expanding shock waves

Abstract

In the range of hc<h<1+2 M2, where h is the D'yakov-Kontorovich parameter, hc is its critical value corresponding to the onset of the spontaneous acoustic emission, and M2 is the downstream Mach number, the classic analysis predicts a special form of the instability of isolated steady planar shock waves: non-decaying oscillations of shock-front ripples. For spherically and cylindrically expanding steady shock waves, we demonstrate instead an instability in a literal sense, a power-law growth of shock-front perturbations with time. As the parameter h increases from hc to 1+2 M2, the instability power index grows from zero to infinity. Shock divergence is a stabilizing factor, and instability is found for high angular mode numbers.