Probability approximation schemes for stochastic programs with distributionally robust second order dominance constraints
Probability approximation schemes for stochastic programs with distributionally robust second order dominance constraints
Since the pioneering work by Dentcheva and Ruszczy?ski [Optimization with stochastic dominance constraints, SIAM J. Optim. 14 (2003), pp. 548–566], stochastic programs with second-order dominance constraints (SPSODC) have received extensive discussions over the past decade from theory of optimality to numerical schemes and practical applications. In this paper, we investigate discrete approximation of SPSODC when (a) the true probability is known but continuously distributed and (b) the true probability distribution is unknown but it lies within an ambiguity set of distributions. Differing from the well-known Monte Carlo discretization method, we propose a deterministic discrete approximation scheme due to Pflug and Pichler [Approximations for Probability Distributions and Stochastic Optimization Problems, International Series in Operations Research & Management Science, Vol. 163, Springer, New York, 2011, pp. 343–387] and demonstrate that the discrete probability measure and the ambiguity set of discrete probability measures approximate their continuous counterparts under the Kantorovich metric. Stability analysis of the optimal value and optimal solutions of the resulting discrete optimization problems is presented and some comparative numerical test results are reported.
1-21
Guo, Shaoyan
6d5abaf4-1f0c-440b-a2d0-f6c856d2d723
Xu, Huifu
d3200e0b-ad1d-4cf7-81aa-48f07fb1f8f5
Zhang, Liwei
10fce21c-16d9-4096-b07a-cf2cab1591c0
Guo, Shaoyan
6d5abaf4-1f0c-440b-a2d0-f6c856d2d723
Xu, Huifu
d3200e0b-ad1d-4cf7-81aa-48f07fb1f8f5
Zhang, Liwei
10fce21c-16d9-4096-b07a-cf2cab1591c0
Guo, Shaoyan, Xu, Huifu and Zhang, Liwei
(2016)
Probability approximation schemes for stochastic programs with distributionally robust second order dominance constraints.
Optimization Methods and Software, .
(doi:10.1080/10556788.2016.1175003).
Abstract
Since the pioneering work by Dentcheva and Ruszczy?ski [Optimization with stochastic dominance constraints, SIAM J. Optim. 14 (2003), pp. 548–566], stochastic programs with second-order dominance constraints (SPSODC) have received extensive discussions over the past decade from theory of optimality to numerical schemes and practical applications. In this paper, we investigate discrete approximation of SPSODC when (a) the true probability is known but continuously distributed and (b) the true probability distribution is unknown but it lies within an ambiguity set of distributions. Differing from the well-known Monte Carlo discretization method, we propose a deterministic discrete approximation scheme due to Pflug and Pichler [Approximations for Probability Distributions and Stochastic Optimization Problems, International Series in Operations Research & Management Science, Vol. 163, Springer, New York, 2011, pp. 343–387] and demonstrate that the discrete probability measure and the ambiguity set of discrete probability measures approximate their continuous counterparts under the Kantorovich metric. Stability analysis of the optimal value and optimal solutions of the resulting discrete optimization problems is presented and some comparative numerical test results are reported.
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Accepted/In Press date: 1 April 2016
e-pub ahead of print date: 2 May 2016
Organisations:
Operational Research
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Local EPrints ID: 390737
URI: http://eprints.soton.ac.uk/id/eprint/390737
ISSN: 1055-6788
PURE UUID: de13208b-7520-418e-a7d5-5ea0b323accd
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Date deposited: 07 Apr 2016 07:55
Last modified: 15 Mar 2024 05:28
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Author:
Shaoyan Guo
Author:
Huifu Xu
Author:
Liwei Zhang
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