The geometry of indefinite J-spaces and stability behavior of linear systems

New relations are established between the spectrum of a linear system and the indices of inertia of its quadratic integral. A detailed investigation is made of the case in which the positive and negative indices of inertia of the quadratic integral are identical. Conditions are found under which the

A computational model to analyze the linear stability properties of general toroidal systems in the ideal magnetohydrodynamic limit is presented. This model includes an explicit treatment of the asymptotic singular behavior at rational surfaces. It is verified through application to internal kink mo

In this paper we study the asymptotic behavior of the stability radius of a singularly perturbed system when the small parameter tends to zero. It is proved that for such systems the stability radius tends to the min(r , r ), where r is the inverse of the H -norm of the reduced slow model and r is t

It has recently been reported that any viscously damped linear system can be decoupled in the configuration space by a real, nonlinear, time-dependent transformation. The purpose of this rapid communication is to provide a few clarifying remarks about the decoupling operation. It is shown that, for