Spectral analysis of the incompressible viscous Rayleigh-Taylor system in R3

Abstract

The linear instability study of the viscous Rayleigh-Taylor model in the neighborhood of a laminar smooth increasing density profile 0(x3) amounts to the study of the following ordinary differential equation of order 4: equationMainEq -λ2 [ 0 k2 φ - (0 φ')'] = λ μ (φ(4) - 2k2 φ" + k4 φ) - gk2 0'φ, equation where λ is the growth rate in time, k is the wave number transverse to the density profile. In the case of '0≥ 0 compactly supported, we provide a spectral analysis showing that in accordance with the results of HL03, there is an infinite sequence of non trivial solutions (λn, φn), with λn→ 0 when n→ +∞ and φn∈ H4(R). In the more general case where 0'>0 everywhere and 0 converges at ∞ to finite limits >0, we prove that there exist finitely non trivial solutions (λn, φn). The line of investigation is to reduce both cases to the study of an operator on a compact set.