Stability and asymptotic behavior of difference equations

The asymptotic behavior of the solutions of a class of functional-difference equations is studied. The results obtained, which are applied to delay difference equations and summary difference equations, give good estimates and explicit radius of attraction. ~

Matrix Riccati difference equations are investigated on the infinite index set. Under natural assumptions an existence and uniqueness theorem is proven. The existence of the asymptotic expansion of the solution and computability of its coefficients are shown, provided the coefficients of the equatio

This paper is concerned with the oscillation of solutions of neutral difference equation and the asymptotic behavior of solutions of delay difference equation t E I, where I is the discrete set (0, 1,2,. . . } and A is the forward difference operator Ar(t) = z(t+l) --2(t).