Asymptotic Γ-distribution for stochastic difference equations

In this paper, we consider an asymptotic normality problem for a vector stochastic difference equation of the form where B is a stable matrix, and E n Ä n 0, a n is a positive real step size sequence with a n Ä n 0, n=1 a n = , and a &1 n+1 &a &1 n Ä n \* 0, u n is an infinite-term moving average p

In this paper, we show asymptotic formulae for solutions of the nonlinear functional difference equation y(n + 1) = L(yn) + V(n, yn) + f(n, Yn), where yn(O) = y(n + O) for 0 • {-r, -r + 1,..., 0}, L, V(n, .) are linear applications, and f(n, .) is not necessarily linear defined from {-r,-r+ 1,... ,0

Many processes in automatic regulation, physics, mechanics, biology, economy, ecology, etc. can be modelled by hereditary systems (see, e.g., [1][2][3][4]). One of the main problems for the theory of such systems and their applications is connected with stability (see, e.g., [2][3][4]). Many stabili