Least squares approximation to the distribution of project completion times with Gaussian uncertainty
This paper is motivated by the following question: How to construct good approximation for the distribution of the solution value to linear optimization problem when the random objective coefficients follow a multivariate normal distribution? Using Stein’s Identity, we show that the least squares no...
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2016
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sg-smu-ink.lkcsb_research-61252017-06-13T03:02:32Z Least squares approximation to the distribution of project completion times with Gaussian uncertainty ZHENG, Zhichao Natarajan, Karthik TEO, Chung-Piaw This paper is motivated by the following question: How to construct good approximation for the distribution of the solution value to linear optimization problem when the random objective coefficients follow a multivariate normal distribution? Using Stein’s Identity, we show that the least squares normal approximation of the random optimal value can be computed by estimating the persistency values of the corresponding optimization problem. We further extend our method to construct a least squares quadratic estimator to improve the accuracy of the approximation; in particular, to capture the skewness of the objective. Computational studies show that the new approach provides more accurate estimates of the distributions of project completion times compared to existing methods. 2016-11-01T07:00:00Z text application/pdf https://ink.library.smu.edu.sg/lkcsb_research/5126 info:doi/10.1287/opre.2016.1528 https://ink.library.smu.edu.sg/context/lkcsb_research/article/6125/viewcontent/LeastSquaresApproximationDistributionProjectCompletionTimesGaussianUncertainty.pdf http://creativecommons.org/licenses/by-nc-nd/4.0/ Research Collection Lee Kong Chian School Of Business eng Institutional Knowledge at Singapore Management University Distribution Approximation Persistency Stein's Identity Project Management Statistical Timing Analysis Business Operations and Supply Chain Management |
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Distribution Approximation Persistency Stein's Identity Project Management Statistical Timing Analysis Business Operations and Supply Chain Management |
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Distribution Approximation Persistency Stein's Identity Project Management Statistical Timing Analysis Business Operations and Supply Chain Management ZHENG, Zhichao Natarajan, Karthik TEO, Chung-Piaw Least squares approximation to the distribution of project completion times with Gaussian uncertainty |
| description |
This paper is motivated by the following question: How to construct good approximation for the distribution of the solution value to linear optimization problem when the random objective coefficients follow a multivariate normal distribution? Using Stein’s Identity, we show that the least squares normal approximation of the random optimal value can be computed by estimating the persistency values of the corresponding optimization problem. We further extend our method to construct a least squares quadratic estimator to improve the accuracy of the approximation; in particular, to capture the skewness of the objective. Computational studies show that the new approach provides more accurate estimates of the distributions of project completion times compared to existing methods. |
| format |
text |
| author |
ZHENG, Zhichao Natarajan, Karthik TEO, Chung-Piaw |
| author_facet |
ZHENG, Zhichao Natarajan, Karthik TEO, Chung-Piaw |
| author_sort |
ZHENG, Zhichao |
| title |
Least squares approximation to the distribution of project completion times with Gaussian uncertainty |
| title_short |
Least squares approximation to the distribution of project completion times with Gaussian uncertainty |
| title_full |
Least squares approximation to the distribution of project completion times with Gaussian uncertainty |
| title_fullStr |
Least squares approximation to the distribution of project completion times with Gaussian uncertainty |
| title_full_unstemmed |
Least squares approximation to the distribution of project completion times with Gaussian uncertainty |
| title_sort |
least squares approximation to the distribution of project completion times with gaussian uncertainty |
| publisher |
Institutional Knowledge at Singapore Management University |
| publishDate |
2016 |
| url |
https://ink.library.smu.edu.sg/lkcsb_research/5126 https://ink.library.smu.edu.sg/context/lkcsb_research/article/6125/viewcontent/LeastSquaresApproximationDistributionProjectCompletionTimesGaussianUncertainty.pdf |
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1770573291628527616 |