Solving the watchman route problem on a grid with heuristic search

Shawn Seiref; Tamir Jaffey; Margarita Lopatin; Ariel Felner

doi:10.1609/icaps.v30i1.6668

Solving the watchman route problem on a grid with heuristic search

Shawn Seiref
, Tamir Jaffey
, Margarita Lopatin
, Ariel Felner

Research output: Contribution to journal › Conference article › peer-review

5 Scopus citations

Abstract

In this paper we optimally solve the Watchman Route Problem (WRP) on a grid. We are given a grid map with obstacles and the task is to (offline) find a (shortest) path through the grid such that all cells in the map can be visually seen by at least one cell on the path. We formalize WRP as a heuristic search problem and solve it with an A*-based algorithm. We develop a series of admissible heuristics with increasing difficulty and accuracy. In particular, our heuristics abstract the problem into line-of-sight clusters graph. Then, solutions for the minimum spanning tree (MST) and the traveling salesman problem (TSP) on this graph are used as admissible heuristics for WRP. We theoretically and experimentally study these heuristics and show that we can optimally and suboptimally solve problems of increasing difficulties.

Original language	English
Pages (from-to)	249-257
Number of pages	9
Journal	Proceedings International Conference on Automated Planning and Scheduling, ICAPS
Volume	30
DOIs	https://doi.org/10.1609/icaps.v30i1.6668
State	Published - 29 May 2020
Event	30th International Conference on Automated Planning and Scheduling, ICAPS 2020 - Nancy, France Duration: 26 Oct 2020 → 30 Oct 2020

ASJC Scopus subject areas

Artificial Intelligence
Computer Science Applications
Information Systems and Management

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10.1609/icaps.v30i1.6668

Cite this

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title = "Solving the watchman route problem on a grid with heuristic search",

abstract = "In this paper we optimally solve the Watchman Route Problem (WRP) on a grid. We are given a grid map with obstacles and the task is to (offline) find a (shortest) path through the grid such that all cells in the map can be visually seen by at least one cell on the path. We formalize WRP as a heuristic search problem and solve it with an A*-based algorithm. We develop a series of admissible heuristics with increasing difficulty and accuracy. In particular, our heuristics abstract the problem into line-of-sight clusters graph. Then, solutions for the minimum spanning tree (MST) and the traveling salesman problem (TSP) on this graph are used as admissible heuristics for WRP. We theoretically and experimentally study these heuristics and show that we can optimally and suboptimally solve problems of increasing difficulties.",

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AU - Seiref, Shawn

AU - Jaffey, Tamir

AU - Lopatin, Margarita

AU - Felner, Ariel

PY - 2020/5/29

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N2 - In this paper we optimally solve the Watchman Route Problem (WRP) on a grid. We are given a grid map with obstacles and the task is to (offline) find a (shortest) path through the grid such that all cells in the map can be visually seen by at least one cell on the path. We formalize WRP as a heuristic search problem and solve it with an A*-based algorithm. We develop a series of admissible heuristics with increasing difficulty and accuracy. In particular, our heuristics abstract the problem into line-of-sight clusters graph. Then, solutions for the minimum spanning tree (MST) and the traveling salesman problem (TSP) on this graph are used as admissible heuristics for WRP. We theoretically and experimentally study these heuristics and show that we can optimally and suboptimally solve problems of increasing difficulties.

AB - In this paper we optimally solve the Watchman Route Problem (WRP) on a grid. We are given a grid map with obstacles and the task is to (offline) find a (shortest) path through the grid such that all cells in the map can be visually seen by at least one cell on the path. We formalize WRP as a heuristic search problem and solve it with an A*-based algorithm. We develop a series of admissible heuristics with increasing difficulty and accuracy. In particular, our heuristics abstract the problem into line-of-sight clusters graph. Then, solutions for the minimum spanning tree (MST) and the traveling salesman problem (TSP) on this graph are used as admissible heuristics for WRP. We theoretically and experimentally study these heuristics and show that we can optimally and suboptimally solve problems of increasing difficulties.

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DO - 10.1609/icaps.v30i1.6668

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JO - Proceedings International Conference on Automated Planning and Scheduling, ICAPS

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T2 - 30th International Conference on Automated Planning and Scheduling, ICAPS 2020

Y2 - 26 October 2020 through 30 October 2020

ER -

Solving the watchman route problem on a grid with heuristic search

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