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Abstract
In this paper some local properties of the solutions to nonsmooth variational inequalities are established. The perturbed solutions to the nonsmooth variational inequalities are shown to be locally Lipschitzian continuous in the ordinary or the generalized sense at the local solution points under certain regular conditions and/or generalized second-order sufficient conditions whether the constraints set is polyhedral or not. The conditions for ensuring the local uniqueness of the local solutions and the stationary points are also given in the nonpolyhedral casc
1This research is the part of author’s Ph. D. Dissertation written under the supervision of Professor LiqunQi of University of New South Wales. It was supported by an EMSS scholarship from the Australian International Development Assistance Bureau
1This research is the part of author’s Ph. D. Dissertation written under the supervision of Professor LiqunQi of University of New South Wales. It was supported by an EMSS scholarship from the Australian International Development Assistance Bureau
Notes
1This research is the part of author’s Ph. D. Dissertation written under the supervision of Professor LiqunQi of University of New South Wales. It was supported by an EMSS scholarship from the Australian International Development Assistance Bureau