Theory of the collapsing axisymmetric cavity
Abstract
We investigate the collapse of an axisymmetric cavity or bubble inside a fluid of small viscosity, like water. Any effects of the gas inside the cavity as well as of the fluid viscosity are neglected. Using a slender-body description, we show that the minimum radius of the cavity scales like h0 t'α, where t' is the time from collapse. The exponent α very slowly approaches a universal value according to α=1/2 + 1/(4-(t')). Thus, as observed in a number of recent experiments, the scaling can easily be interpreted as evidence of a single non-trivial scaling exponent. Our predictions are confirmed by numerical simulations.
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