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1. Identity statement
Reference TypeConference Paper (Conference Proceedings)
Sitesibgrapi.sid.inpe.br
Holder Codeibi 8JMKD3MGPEW34M/46T9EHH
Identifier6qtX3pFwXQZG2LgkFdY/QGG9a
Repositorysid.inpe.br/sibgrapi@80/2007/07.09.17.59
Last Update2007:07.09.17.59.09 (UTC) administrator
Metadata Repositorysid.inpe.br/sibgrapi@80/2007/07.09.17.59.10
Metadata Last Update2022:06.14.00.13.27 (UTC) administrator
DOI10.1109/SIBGRAPI.2007.15
Citation KeyCoutoSouzReze:2007:ExEfAl
TitleAn Exact and Efficient Algorithm for the Orthogonal Art Gallery Problem
FormatPrinted, On-line.
Year2007
Access Date2024, Oct. 04
Number of Files1
Size210 KiB
2. Context
Author1 Couto, Marcelo C.
2 Souza, Cid C. de
3 Rezende, Pedro J. de
Affiliation1 Institute of Computing, State University of Campinas, Campinas - Brazil
2 Institute of Computing, State University of Campinas, Campinas - Brazil
3 Institute of Computing, State University of Campinas, Campinas - Brazil
EditorFalcão, Alexandre Xavier
Lopes, Hélio Côrtes Vieira
Conference NameBrazilian Symposium on Computer Graphics and Image Processing, 20 (SIBGRAPI)
Conference LocationBelo Horizonte, MG, Brazil
Date7-10 Oct. 2007
PublisherIEEE Computer Society
Publisher CityLos Alamitos
Book TitleProceedings
Tertiary TypeFull Paper
History (UTC)2007-07-09 17:59:10 :: cid@ic.unicamp.br -> administrator ::
2007-08-02 21:17:16 :: administrator -> cid@ic.unicamp.br ::
2008-07-17 14:09:42 :: cid@ic.unicamp.br -> administrator ::
2009-08-13 20:38:18 :: administrator -> banon ::
2010-08-28 20:02:26 :: banon -> administrator ::
2022-06-14 00:13:27 :: administrator -> :: 2007
3. Content and structure
Is the master or a copy?is the master
Content Stagecompleted
Transferable1
Version Typefinaldraft
KeywordsArt Gallery
Exact Solution
Orthogonal Polygons
Integer Programming
Set Covering
AbstractIn this paper, we propose an exact algorithm to solve the Orthogonal Art Gallery problem in which guards can only be placed on the vertices of the polygon $ P$ representing the gallery. Our approach is based on a discretization of $ P$ into a finite set of points in its interior. The algorithm repeatedly solves an instance of the Set Cover problem obtaining a minimum set $ Z$ of vertices of $ P$ that can view all points in the current discretization. Whenever $ P$ is completely visible from $ Z$ , the algorithm halts; otherwise, the discretization is refined and another iteration takes place. We establish that the algorithm always converges to an optimal solution by presenting a worst case analysis of the number of iterations that could be effected. Even though these could theoretically reach $ O(n^4)$ , our computational experiments reveal that, in practice, they are linear in $ n$ and, for $ n\leq 200$ , they actually remain less than three in almost all instances. Furthermore, the low number of points in the initial discretization, $ O(n^2)$ , compared to the possible $ O(n^4)$ atomic visibility polygons, renders much shorter total execution times. Optimal solutions found for different classes of instances of polygons with up to 200 vertices are also described.
Arrangement 1urlib.net > SDLA > Fonds > SIBGRAPI 2007 > An Exact and...
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4. Conditions of access and use
data URLhttp://urlib.net/ibi/6qtX3pFwXQZG2LgkFdY/QGG9a
zipped data URLhttp://urlib.net/zip/6qtX3pFwXQZG2LgkFdY/QGG9a
Languageen
Target Filecouto-ArtGallery.pdf
User Groupcid@ic.unicamp.br
administrator
Visibilityshown
5. Allied materials
Next Higher Units8JMKD3MGPEW34M/46SF8Q5
8JMKD3MGPEW34M/4742MCS
Citing Item Listsid.inpe.br/sibgrapi/2022/05.14.00.14 26
sid.inpe.br/sibgrapi/2022/06.10.21.49 2
Host Collectionsid.inpe.br/banon/2001/03.30.15.38
6. Notes
Empty Fieldsarchivingpolicy archivist area callnumber contenttype copyholder copyright creatorhistory descriptionlevel dissemination documentstage e-mailaddress edition electronicmailaddress group isbn issn label lineage mark mirrorrepository nextedition notes numberofvolumes orcid organization pages parameterlist parentrepositories previousedition previouslowerunit progress project readergroup readpermission resumeid rightsholder schedulinginformation secondarydate secondarykey secondarymark secondarytype serieseditor session shorttitle sponsor subject tertiarymark type url volume


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