A sampling approach for proactive project scheduling under generalized time-dependent workability uncertainty
In real-world project scheduling applications, activity durations are often uncertain. Proactive scheduling can effectively cope with the duration uncertainties, by generating robust baseline solutions according to a priori stochastic knowledge. However, most of the existing proactive approaches ass...
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sg-smu-ink.sis_research-91992023-10-04T05:26:33Z A sampling approach for proactive project scheduling under generalized time-dependent workability uncertainty SONG, Wen KANG, Donghun ZHANG, Jie CAO, Zhiguang XI, Hui In real-world project scheduling applications, activity durations are often uncertain. Proactive scheduling can effectively cope with the duration uncertainties, by generating robust baseline solutions according to a priori stochastic knowledge. However, most of the existing proactive approaches assume that the duration uncertainty of an activity is not related to its scheduled start time, which may not hold in many real-world scenarios. In this paper, we relax this assumption by allowing the duration uncertainty to be time-dependent, which is caused by the uncertainty of whether the activity can be executed on each time slot. We propose a stochastic optimization model to find an optimal Partial-order Schedule (POS) that minimizes the expected makespan. This model can cover both the time-dependent uncertainty studied in this paper and the traditional time-independent duration uncertainty. To circumvent the underlying complexity in evaluating a given solution, we approximate the stochastic optimization model based on Sample Average Approximation (SAA). Finally, we design two efficient branch-and-bound algorithms to solve the NP-hard SAA problem. Empirical evaluation confirms that our approach can generate high-quality proactive solutions for a variety of uncertainty distributions. 2019-02-01T08:00:00Z text application/pdf https://ink.library.smu.edu.sg/sis_research/8196 info:doi/10.1613/jair.1.11369 https://ink.library.smu.edu.sg/context/sis_research/article/9199/viewcontent/A_Sampling_Approach_for_Proactive_Project_Scheduling_under_Generalized_Time_dependent_Workability_Uncertainty.pdf http://creativecommons.org/licenses/by-nc-nd/4.0/ Research Collection School Of Computing and Information Systems eng Institutional Knowledge at Singapore Management University Branch-and-bound algorithms Empirical evaluations Partial order schedules Proactive scheduling Real-world scenario Sample average approximation Stochastic optimization model Uncertainty distributions Theory and Algorithms |
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Branch-and-bound algorithms Empirical evaluations Partial order schedules Proactive scheduling Real-world scenario Sample average approximation Stochastic optimization model Uncertainty distributions Theory and Algorithms |
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Branch-and-bound algorithms Empirical evaluations Partial order schedules Proactive scheduling Real-world scenario Sample average approximation Stochastic optimization model Uncertainty distributions Theory and Algorithms SONG, Wen KANG, Donghun ZHANG, Jie CAO, Zhiguang XI, Hui A sampling approach for proactive project scheduling under generalized time-dependent workability uncertainty |
| description |
In real-world project scheduling applications, activity durations are often uncertain. Proactive scheduling can effectively cope with the duration uncertainties, by generating robust baseline solutions according to a priori stochastic knowledge. However, most of the existing proactive approaches assume that the duration uncertainty of an activity is not related to its scheduled start time, which may not hold in many real-world scenarios. In this paper, we relax this assumption by allowing the duration uncertainty to be time-dependent, which is caused by the uncertainty of whether the activity can be executed on each time slot. We propose a stochastic optimization model to find an optimal Partial-order Schedule (POS) that minimizes the expected makespan. This model can cover both the time-dependent uncertainty studied in this paper and the traditional time-independent duration uncertainty. To circumvent the underlying complexity in evaluating a given solution, we approximate the stochastic optimization model based on Sample Average Approximation (SAA). Finally, we design two efficient branch-and-bound algorithms to solve the NP-hard SAA problem. Empirical evaluation confirms that our approach can generate high-quality proactive solutions for a variety of uncertainty distributions. |
| format |
text |
| author |
SONG, Wen KANG, Donghun ZHANG, Jie CAO, Zhiguang XI, Hui |
| author_facet |
SONG, Wen KANG, Donghun ZHANG, Jie CAO, Zhiguang XI, Hui |
| author_sort |
SONG, Wen |
| title |
A sampling approach for proactive project scheduling under generalized time-dependent workability uncertainty |
| title_short |
A sampling approach for proactive project scheduling under generalized time-dependent workability uncertainty |
| title_full |
A sampling approach for proactive project scheduling under generalized time-dependent workability uncertainty |
| title_fullStr |
A sampling approach for proactive project scheduling under generalized time-dependent workability uncertainty |
| title_full_unstemmed |
A sampling approach for proactive project scheduling under generalized time-dependent workability uncertainty |
| title_sort |
sampling approach for proactive project scheduling under generalized time-dependent workability uncertainty |
| publisher |
Institutional Knowledge at Singapore Management University |
| publishDate |
2019 |
| url |
https://ink.library.smu.edu.sg/sis_research/8196 https://ink.library.smu.edu.sg/context/sis_research/article/9199/viewcontent/A_Sampling_Approach_for_Proactive_Project_Scheduling_under_Generalized_Time_dependent_Workability_Uncertainty.pdf |
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