Abstract
We analyze the local upper Lipschitz behavior of critical points, stationary solutions and local minimizers to parametric C1,1 programs. In particular, we derive a characterization of this property for the stationary solution set map without assuming the Mangasarian---Fromovitz CQ. Moreover, conditions which also ensure the persistence of solvability are given, and the special case of linear constraints is handled. The present paper takes pattern from [21] by continuing the approach via contingent derivatives of the Kojima function associated with the given optimization problem.
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