Noise-induced global asymptotic stability

Equivalence is shown for discrete time systems between global asymptotic stability and the so-called integral Input-to-State Stability. The latter is a notion of robust stability with respect to exogenous disturbances which informally translates into the statement "no matter what is the initial cond

The global asymptotic stability of "second-order" relay control systems with negative eigenvalues is shown to be a consequence of the nonexistence of symmetric periodic solutions. The result shows further that, ezcept for a special case, the solutions reach tke origin in fkwitc time.

We prove a generalized Liapunov theorem which guarantees practical asymptotic stability. Based on this theorem, we show that if the averaged system ẋ = fav(x) corresponding to ẋ = f(x; t) is globally asymptotically stable then, starting from an arbitrarily large set of initial conditions, the trajec