It is known that in the approximation of an abstract parabolic equation, an explicit difference scheme is stable when the discrete time and space steps satisfy the conditions \(\tau_ n\leq ch^ 2_ n\), where c is a constant. We prove that, in the solution of a first-order evolution equation with almost periodic solutions (a hyperbolic equation), the conditions \(\tau_ n\leq ch_ n\) must be satisfied if we are to have stability.