On the induced norms of discrete-time and hybrid time-varying systems

The problem of the local stabilization of linear discrete-time systems subject to bounded controls and suffering from uncertainty of the norm-bounded time-varying type is addressed. From the solution of a certain discrete Riccati equation, a control gain and a set of safe initial conditions are obta

In a recent article on stability of discrete inclusions the authors argue that the problem of determining stability of discrete inclusions given by convex sets of matrices with a finite number of extremal points is NP-hard. It is shown that the argument that has been employed is inconclusive and thu

The well-known scaled small gain condition guarantees stability for a linear time invariant system subject to bounded complex nonlinear and/or time-varying perturbations. A polynomial time computable condition is derived that can be substantially less conservative for gain scheduled and other multiv

The problem of calculating the maximal Lyapunov exponent (generalized spectral radius) of a discrete inclusion is formulated as an average yield optimal control problem. It is shown that the maximal value of this problem can be approximated by the maximal value of discounted optimal control problems