Asymptotic behaviour of the Rayleigh--Taylor instability
Abstract
We investigate long time numerical simulations of the inviscid Rayleigh-Taylor instability at Atwood number one using a boundary integral method. We are able to attain the asymptotic behavior for the spikes predicted by Clavin & Williamsclavin for which we give a simplified demonstration. In particular we observe that the spike's curvature evolves like t3 while the overshoot in acceleration shows a good agreement with the suggested 1/t5 law. Moreover, we obtain consistent results for the prefactor coefficients of the asymptotic laws. Eventually we exhibit the self-similar behavior of the interface profile near the spike.
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