On the Convergence of Coderivative of SAA Solution Mapping for a Parametric Stochastic Variational Inequality |
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Authors: | Jie Zhang Li-wei Zhang Li-ping Pang |
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Institution: | 1. Institute of ORCT, School of Mathematical Sciences, Dalian University of Technology, Dalian, 116024, China
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Abstract: | The aim of this paper is to investigate the convergence properties for Mordukhovich’s coderivative of the solution map of
the sample average approximation (SAA) problem for a parametric stochastic variational inequality with equality and inequality
constraints. The notion of integrated deviation is introduced to characterize the outer limit of a sequence of sets. It is
demonstrated that, under suitable conditions, both the cosmic deviation and the integrated deviation between the coderivative
of the solution mapping to SAA problem and that of the solution mapping to the parametric stochastic variational inequality
converge almost surely to zero as the sample size tends to infinity. Moreover, the exponential convergence rate of coderivatives
of the solution maps to the SAA parametric stochastic variational inequality is established. The results are used to develop
sufficient conditions for the consistency of the Lipschitz-like property of the solution map of SAA problem and the consistency
of stationary points of the SAA estimator for a stochastic bilevel program. |
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Keywords: | |
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