Approximation Algorithms for Multi-Robot Patrol-Scheduling with Min-Max Latency

Peyman Afshani; Mark de Berg; Kevin Buchin; Jie Gao; Maarten Löffler; Amir Nayyeri; Benjamin Raichel; Rik Sarkar; Haotian Wang; Hao Tsung Yang

doi:10.1007/978-3-030-66723-8_7

Approximation Algorithms for Multi-Robot Patrol-Scheduling with Min-Max Latency

Peyman Afshani, Mark de Berg, Kevin Buchin, Jie Gao, Maarten Löffler, Amir Nayyeri, Benjamin Raichel, Rik Sarkar, Haotian Wang, Hao Tsung Yang

Onderzoeksoutput: Hoofdstuk in Boek/Rapport/Congresprocedure › Hoofdstuk › Academic › peer review

5 Citaten (Scopus)

Samenvatting

We consider the problem of finding patrol schedules for k robots to visit a given set of n sites in a metric space. Each robot has the same maximum speed and the goal is to minimize the weighted maximum latency of any site, where the latency of a site is defined as the maximum time duration between consecutive visits of that site. The problem is NP-hard, as it has the traveling salesman problem as a special case (when k= 1 and all sites have the same weight). We present a polynomial-time algorithm with an approximation factor of O(k2logwmaxwmin) to the optimal solution, where w_max and w_min are the maximum and minimum weight of the sites respectively. Further, we consider the special case where the sites are in 1D. When all sites have the same weight, we present a polynomial-time algorithm to solve the problem exactly. If the sites may have different weights, we present a 12-approximate solution, which runs in time (nwmax/wmin)O(k).

Originele taal-2	Engels
Titel	Springer Proceedings in Advanced Robotics
Uitgeverij	Springer
Pagina's	107-123
Aantal pagina's	17
DOI's	https://doi.org/10.1007/978-3-030-66723-8_7
Status	Gepubliceerd - 2021

Publicatie series

Naam	Springer Proceedings in Advanced Robotics
Volume	17
ISSN van geprinte versie	2511-1256
ISSN van elektronische versie	2511-1264

Bibliografische nota

Funding Information:
Gao, Wang and Yang would like to acknowledge supports from NSF CNS-1618391, DMS-1737812, OAC-1939459. Raichel would like acknowledge support from NSF CAREER Award 1750780.

Funding Information:
Acknowledgement. Gao, Wang and Yang would like to acknowledge supports from NSF CNS-1618391, DMS-1737812, OAC-1939459. Raichel would like acknowledge support from NSF CAREER Award 1750780.

Publisher Copyright:
© 2021, The Author(s), under exclusive license to Springer Nature Switzerland AG.

Financiering

Gao, Wang and Yang would like to acknowledge supports from NSF CNS-1618391, DMS-1737812, OAC-1939459. Raichel would like acknowledge support from NSF CAREER Award 1750780. Acknowledgement. Gao, Wang and Yang would like to acknowledge supports from NSF CNS-1618391, DMS-1737812, OAC-1939459. Raichel would like acknowledge support from NSF CAREER Award 1750780.

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10.1007/978-3-030-66723-8_7

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Afshani, P., de Berg, M., Buchin, K., Gao, J., Löffler, M., Nayyeri, A., Raichel, B., Sarkar, R., Wang, H., & Yang, H. T. (2021). Approximation Algorithms for Multi-Robot Patrol-Scheduling with Min-Max Latency. In Springer Proceedings in Advanced Robotics (blz. 107-123). (Springer Proceedings in Advanced Robotics; Vol. 17). Springer. https://doi.org/10.1007/978-3-030-66723-8_7

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abstract = "We consider the problem of finding patrol schedules for k robots to visit a given set of n sites in a metric space. Each robot has the same maximum speed and the goal is to minimize the weighted maximum latency of any site, where the latency of a site is defined as the maximum time duration between consecutive visits of that site. The problem is NP-hard, as it has the traveling salesman problem as a special case (when k= 1 and all sites have the same weight). We present a polynomial-time algorithm with an approximation factor of O(k2logwmaxwmin) to the optimal solution, where wmax and wmin are the maximum and minimum weight of the sites respectively. Further, we consider the special case where the sites are in 1D. When all sites have the same weight, we present a polynomial-time algorithm to solve the problem exactly. If the sites may have different weights, we present a 12-approximate solution, which runs in time (nwmax/wmin)O(k).",

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AU - Buchin, Kevin

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AU - Löffler, Maarten

AU - Nayyeri, Amir

AU - Raichel, Benjamin

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AB - We consider the problem of finding patrol schedules for k robots to visit a given set of n sites in a metric space. Each robot has the same maximum speed and the goal is to minimize the weighted maximum latency of any site, where the latency of a site is defined as the maximum time duration between consecutive visits of that site. The problem is NP-hard, as it has the traveling salesman problem as a special case (when k= 1 and all sites have the same weight). We present a polynomial-time algorithm with an approximation factor of O(k2logwmaxwmin) to the optimal solution, where wmax and wmin are the maximum and minimum weight of the sites respectively. Further, we consider the special case where the sites are in 1D. When all sites have the same weight, we present a polynomial-time algorithm to solve the problem exactly. If the sites may have different weights, we present a 12-approximate solution, which runs in time (nwmax/wmin)O(k).

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Approximation Algorithms for Multi-Robot Patrol-Scheduling with Min-Max Latency

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