A New Upper Bound for the Largest Growth Rate of Linear Rayleigh--Taylor Instability

Abstract

We investigate the effect of surface tension on the linear Rayleigh--Taylor (RT) instability in stratified incompressible viscous fluids with or without (interface) surface tension. The existence of linear RT instability solutions with largest growth rate is proved under the instability condition (i.e., the surface tension coefficient is less than a threshold c) by modified variational method of PDEs. Moreover we find a new upper bound for . In particular, we observe from the upper bound that decreasingly converges to zero, as goes from zero to the threshold c. The convergence behavior of mathematically verifies the classical RT instability experiment that the instability growth is limited by surface tension during the linear stage.