Covering oriented points in the plane with orthogonal polygons is NP-complete

Covering oriented points in the plane with orthogonal polygons is NP-complete

We address the problem of covering points with orthogonal polygons. Specifically, given a set of n grid-points in the plane each designated in advance with either a horizontal or vertical reading, we investigate the existence of an orthogonal polygon covering these n points in such a way that each e...

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Bibliographic Details
Published in:Electronic notes in discrete mathematics Vol. 36; pp. 303 - 310
Main Authors: Evrendilek, Cem, Genç, Burkay, Hnich, Brahim
Format: Journal Article
Language:English
Published: Elsevier B.V 01-08-2010
Subjects:
Computational geometry
Covering
NP-complete
Orthogonal polygon
Computational geometry
Covering
Orthogonal polygon
NP-complete
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Summary:We address the problem of covering points with orthogonal polygons. Specifically, given a set of n grid-points in the plane each designated in advance with either a horizontal or vertical reading, we investigate the existence of an orthogonal polygon covering these n points in such a way that each edge of the polygon covers exactly one point and each point is covered by exactly one edge with the additional requirement that the reading associated with each point dictates whether the edge covering it is to be horizontal or vertical. We show that this problem is NP-complete.
ISSN:1571-0653
1571-0653
DOI:10.1016/j.endm.2010.05.039