For VDIDEs, although some research have been presented, there still exist a lot of open problems keeping to be done both in theory and in computation. Up to now, numerical analysis for VDIDEs were almost all based on the scalar case and the classical Lipschitz condition. In view of this, recently, we developed a series of research for multi-dimensional linear and nonlinear systems of VDIDEs. Where stability theory of systems and their numerical methods were concerned. Some new effective algorithms were derived. In the present talk, the following contents will be introduced:
1 Analytical stability of linear and nonlinear VDIDEs.
2 Stability of Pouzet-Runge-Kutta methods for class RI(
).3 Stability and validity of the extended general linear methods for class GRI(
).