Edgeworth approximations in first-order stochastic difference equations with exogenous variables

consider the first-order neutral nonlinear difference equation of the form A (in -pnyn-r) + qn ijI IY,-0, Ia' sgn Y~-~, = 0, R = 0, 1, where T > 0, t~i 2 0 (i = 1,2,. . ,m) are integers, {p,} and {qn} are nonnegative sequences. We obtain new criteria for the oscillation of the above equation withou

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

This paper is devoted to the study of the existence of solutions of first-order difference equations verifying nonlinear conditions that involve the global behavior of the solution. We prove that the existence of lower and upper solutions warrants the existence of such solutions lying in the sector