An accurate solution to the cardinality-based punctuality problem
This paper focuses on a specific stochastic shortest path (SSP) problem, namely the punctuality problem. It aims to determine a path that maximizes the probability of arriving at the destination before a specified deadline. The popular solution to this problem always formulates it as a cardinality m...
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2020
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sg-smu-ink.sis_research-91542023-09-14T07:48:02Z An accurate solution to the cardinality-based punctuality problem CAO, Zhiguang WU, Yaoxin RAO, Akshay KLANNER, Felix ERSCHEN, Stefan CHEN, Wei ZHANG, Le GUO, Hongliang This paper focuses on a specific stochastic shortest path (SSP) problem, namely the punctuality problem. It aims to determine a path that maximizes the probability of arriving at the destination before a specified deadline. The popular solution to this problem always formulates it as a cardinality minimization problem by considering its data-driven nature, which is approximately solved by the 1 , -norm relaxation. To address this problem accurately, we consider the special character in the cardinality-based punctuality problem and reformulate it by introducing additional variables and constraints, which guarantees an accurate solution. The reformulated punctuality problem can be further transformed into the standard form of integer linear programming (ILP), thus, can be efficiently solved by using the existing ILP solvers. To evaluate the performance of the proposed solution, we provide both theoretical proof of the accuracy, and experimental analysis against the baselines. Particularly, the experimental results show that in the following two scenarios, 1) artificial road network with simulated travel time, 2) real road network with real travel time, our accurate solution works better than others regarding the accuracy and computational efficiency. Furthermore, three ILP solvers, i.e., CBC, GLPK and CPLEX, are tested and compared for the proposed accurate solution. The result shows that CPLEX has obvious advantage over others. 2020-12-01T08:00:00Z text https://ink.library.smu.edu.sg/sis_research/8151 info:doi/10.1109/MITS.2018.2880260 Research Collection School Of Computing and Information Systems eng Institutional Knowledge at Singapore Management University Stochastic processes Minimization Optimization Computational efficiency Automation Integer linear programming Road traffic OS and Networks Transportation |
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Stochastic processes Minimization Optimization Computational efficiency Automation Integer linear programming Road traffic OS and Networks Transportation |
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Stochastic processes Minimization Optimization Computational efficiency Automation Integer linear programming Road traffic OS and Networks Transportation CAO, Zhiguang WU, Yaoxin RAO, Akshay KLANNER, Felix ERSCHEN, Stefan CHEN, Wei ZHANG, Le GUO, Hongliang An accurate solution to the cardinality-based punctuality problem |
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This paper focuses on a specific stochastic shortest path (SSP) problem, namely the punctuality problem. It aims to determine a path that maximizes the probability of arriving at the destination before a specified deadline. The popular solution to this problem always formulates it as a cardinality minimization problem by considering its data-driven nature, which is approximately solved by the 1 , -norm relaxation. To address this problem accurately, we consider the special character in the cardinality-based punctuality problem and reformulate it by introducing additional variables and constraints, which guarantees an accurate solution. The reformulated punctuality problem can be further transformed into the standard form of integer linear programming (ILP), thus, can be efficiently solved by using the existing ILP solvers. To evaluate the performance of the proposed solution, we provide both theoretical proof of the accuracy, and experimental analysis against the baselines. Particularly, the experimental results show that in the following two scenarios, 1) artificial road network with simulated travel time, 2) real road network with real travel time, our accurate solution works better than others regarding the accuracy and computational efficiency. Furthermore, three ILP solvers, i.e., CBC, GLPK and CPLEX, are tested and compared for the proposed accurate solution. The result shows that CPLEX has obvious advantage over others. |
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text |
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CAO, Zhiguang WU, Yaoxin RAO, Akshay KLANNER, Felix ERSCHEN, Stefan CHEN, Wei ZHANG, Le GUO, Hongliang |
| author_facet |
CAO, Zhiguang WU, Yaoxin RAO, Akshay KLANNER, Felix ERSCHEN, Stefan CHEN, Wei ZHANG, Le GUO, Hongliang |
| author_sort |
CAO, Zhiguang |
| title |
An accurate solution to the cardinality-based punctuality problem |
| title_short |
An accurate solution to the cardinality-based punctuality problem |
| title_full |
An accurate solution to the cardinality-based punctuality problem |
| title_fullStr |
An accurate solution to the cardinality-based punctuality problem |
| title_full_unstemmed |
An accurate solution to the cardinality-based punctuality problem |
| title_sort |
accurate solution to the cardinality-based punctuality problem |
| publisher |
Institutional Knowledge at Singapore Management University |
| publishDate |
2020 |
| url |
https://ink.library.smu.edu.sg/sis_research/8151 |
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