The lifetime of shape oscillations of a bubble in an unbounded, inviscid and compressible fluid with surface tension

Abstract

General perturbations of a spherical gas bubble in a compressible and inviscid fluid with surface tension were proved in Shapiro and Weinstein (2011), in the linearized approximation, to decay exponentially, e- t, >0, as time advances. Formal asymptotic and numerical evidence led to the conjecture that ≈ Aε Weε2 (-B Weε2), where 0<ε1 is the Mach number, We is the Weber number, and A and B are positive constants. In this paper, we prove this conjecture and calculate A and B to leading order in ε.