Lyapunov inequalities for discrete linear Hamiltonian systems

In this paper, by using elementary analysis, we establish some new Lyapunov-type inequalities for nonlinear systems of difference equations when the coefficent β 2 (t) is not necessarily nonnegative valued and when the end points are not necessarily usual zeros, but rather, generalized zeros. Applyi

In this paper, we propose certain new bounds for the Lyapunov exponents of discrete time varying linear systems. The bounds are expressed in terms of spectral radii of matrix coefficients and therefore may be used to establish the exponential stability of time varying system on the basis of eigenval

In general, a hybrid dynamic system is a system with different kinds of time dynamics? e.g., continuous, discrete, or impulsive, in different interacting parts of the system. This paper deals with discrete hybrid systems described by the following equations: whereF:N,+oxRmxIWm~IWm, X,:N,foxR"-+iP, W

## Abstract We consider linear Hamiltonian differential systems in __R__^2__n__^ depending on a stationary ergodic Markov process. The induced processes on the Lagrangian manifolds __L~p~__ and L~p~−1, __p__ (1 ≦ __p__ ≦ __n__) are studied. From this we derive representations for the Lyapunov expon