Optimal space coverage with white convex polygons

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Ehsani, S ; Sharif University of Technology

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Type of Document: Article
DOI: 10.1007/s10878-014-9822-1
Abstract:
Assume that we are given a set of points some of which are black and the rest are white. The goal is to find a set of convex polygons with maximum total area that cover all white points and exclude all black points. We study the problem on three different settings (based on overlapping between different convex polygons): (1) In case convex polygons are permitted to have common area, we present a polynomial algorithm. (2) In case convex polygons are not allowed to have common area but are allowed to have common vertices, we prove the NP-hardness of the problem and propose an algorithm whose output is at least (Formula presented.). (3) Finally, in case convex polygons are not allowed to have common area or common vertices, also we prove the NP-hardness of the problem and propose an algorithm whose output is at least (Formula presented.)
Keywords:
Algorithm ; Convex covering ; White convex polygon ; Hardness ; Common areas ; Convex polygon ; NP-hardness ; Optimal space ; Polynomial algorithm ; White point ; Geometry
Source: Journal of Combinatorial Optimization ; Dec , 2014 ; 13826905
URL: http://link.springer.com/article/10.1007%2Fs10878-014-9822-1