Stability of difference Volterra equations: Direct Liapunov method and numerical procedure

We survey some of the fundamental results on the stability and asymptoticity of linear Volterra difference equations. The method of Z-transform is heavily utilized in equations of convolution type. An example is given to show that uniform asymptotic stability does not necessarily imply exponential s

In this paper a discrete analogue of Liapunov Direct Method is applied to the stability analysis of nonlinear, nonautonomous diflerence equations. A class of second and third order equations are analyzed. The Liapunov functions are generated by the use of a Routh canonical transformation. Concrete e

Ahstraet-A family of test equations is suggested for first and second kind nonsingular Volterra integral equations with convolution kernels. It is shown that the numerical stability of multistep methods when applied to these test equations can be characterised as the requirement that the roots of po