Strong stability of nonlinear complementarity problems.

This is a set of viewgraph of my talk that I will deliver at the 13th International Symposium on Mathematical Programming to be held at Chuo University, Tokyo, Japan, from August 29 to September 2, 1988. The following paragraph is the abstract of the talk. A nonlinear complementarity problem is said to be strongly stable at a locally unique solution x if for any perturbation the perturbed problem has a locally unique solution near x. We show that the notion of strong stability can be expressed in terms of parametric nonlinear complementarity problems. We then give necessary and sufficient conditions for strong stability.