The problem of the stability of quasilinear flows with respect to perturbations of the hardening function

We consider the plane Couette flow v 0 = (x n , 0, . . . , 0) in the infinite layer domain , where n ≥ 2 is an integer. The exponential stability of v 0 in L n is shown under the condition that the initial perturbation is periodic in (x 1 , . . . , x n-1 ) and sufficiently small in the L n -norm.

The stability of a two-dimensional parallel flow has been investigated by the energy method. It was found that the flow is stable with respect to spatially periodic disturbances of the type u' = Re [.f(y, z, t) where x is the distance along the direction of the basic flow. This result holds true fo

The Lyapunov-Malkin theorem on stability and (simultaneously) exponential asymptotic stability with respect to part of the variables in the linear approximation in critical cases (in Lyapunov's sense) has served as a point of departure for various previous results. These results are strengthened by

The stability of the equilibrium of gyroscopically coupled quasilinear systems with many degrees of freedom is investigated when there is dissipation and a periodic perturbation which is not necessarily of small amplitude. Non-potential forces (customarily referred to as radial correction forces or