On distributionally robust optimization problems with k-th order stochastic dominance constraints induced by full random quadratic recourse |
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| Authors: | Sainan Zhang Shaoyan Guo Liwei Zhang Hongwei Zhang |
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| Affiliation: | 1. School of Mathematics, Dongbei University of Finance and Economics, Dalian 116025, China;2. School of Mathematical Sciences, Dalian University of Technology, Dalian 116024, China |
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| Abstract: | In this paper, we consider the optimization problems with k-th order stochastic dominance constraint on the objective function of the two-stage stochastic programs with full random quadratic recourse. By establishing the Lipschitz continuity of the feasible set mapping under some pseudo-metric, we show the Lipschitz continuity of the optimal value function and the upper semicontinuity of the optimal solution mapping of the problem. Furthermore, by the Hölder continuity of parameterized ambiguity set under the pseudo-metric, we demonstrate the quantitative stability results of the feasible set mapping, the optimal value function and the optimal solution mapping of the corresponding distributionally robust problem. |
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| Keywords: | Stochastic dominance Distributionally robust optimization Quantitative stability analysis Quadratic programming Probability metric |
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