The Lyapunov exponents of regular systems under small on the average perturbations

## Abstract In the paper there are considered linear Hamiltonian systems in R^2n^ which include a small additive random term depending on a stationary ergodic Markov process. Under some regularity assumptions we derive asymptotic expansions for certain Lyapunov exponents of the systems (or for sums

In this paper, we prove that the magnitude of the largest Lyapunov exponent of attractors appartaining to stochastic dynamic systems is increasing under the influence of noise. Thus we offer an answer to the conjecture posed by Argyris et al. in [l]. We investigate also the influence of an additive

The Lyapunov exponent is a means of quantitatively evaluating the orbit instability of a dynamical system. In calculating the Lyapunov exponent by measuring the time series from a dynamical system, it is necessary to input the time series data into a computer system using an A-D converter. However,