Spectral theory for linearizations of dynamical systems

## Abstract This paper presents an overview of topological, smooth, and control techniques for dynamical systems and their interrelations for the study of perturbed systems. We concentrate on spectral analysis via linearization of systems. Emphasis is placed on parameter dependent perturbed systems

We continue and completely set up the spectral theory initiated in Castorina et al. (2009) [5] for the linearized operator arising from ∆ p u + f (u) = 0. We establish existence and variational characterization of all the eigenvalues, and by a weak Harnack inequality we deduce Hölder continuity for

This paper develops semistability and uniform semistability analysis results for switched linear systems. Semistability is the property whereby the solutions of a dynamical system converge to Lyapunov stable equilibrium points determined by the system's initial conditions. Since solutions to switche