The stability of partial difference systems with retarded arguments

For the partial difference equations ## A(x -a, y) -F A(x, y -b) -A(x, y) + P(x, y)A(x + T, y + a) = 0 and A(x -a, y) + A(x, y -b) -A(x, y) ~-f(x, y, A(x T •, y + q)) = O, we shall obtain sufficient conditions for the oscillation of all solutions of these equations. (~) 2001 Elsevier Science Ltd.

## This paper is concerned with the linear delay partial difference equation where a and v are positive integers, a(i,j), b(i,j), p(i,j) are real sequences defined on i > or, j ) T. Sufficient conditions for this equation to be stable are derived. Stability of certain nonlinear partial difference

This paper deals with the numerical properties of Runge-Kutta methods for the solution of u (t) = au(t) + a 0 u([t + 1 2 ]). It is shown that the Runge-Kutta method can preserve the convergence order. The necessary and sufficient conditions under which the analytical stability region is contained in