The transition to instability in weakly non-uniform flows without dissipation

The conditions for the instability of flows or states, which are independent of time and coordinates, in extended non-onedimensional regions are considered in a linear approximation. An extension of the idea of global instability, previously introduced for the one-dimensional case, is given. A metho

Non-linear vibratory systems are often characterized by external or excitation parameters which vary with time (i.e., are ''non-stationary''). A general methodology is presented to predict analytically the response of some weakly non-linear dissipative systems as an excitation parameter varies slowl

A theorem on the instability of any equilibrium position of a heavy sphere of finite radius in an arbitrary steady potential nonuniform flow of an ideal fluid is proved.

The transmission of sound in a non-uniform two dimensional duct without flow is investigated by a method of weighted residuals which leads to a set of coupled "generalized telegraphists \* equations". Results for several duct configurations are compared with those from, respectively, a variational m

Stationary flow and diffusion distributed structure (FDS) is known to appear in a reaction-diffusion system with open flow when the constant perturbation is applied at the inlet. Usually, the FDS is considered in the oscillatory Hopf domain when the instability of the Hopf mode is convective. This p