Computation of inverse 1-centre location problem on the weighted interval graphs

Jana, Biswanath; Mondal, Sukumar; Pal, Madhumangal

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dc.contributor.author Jana, Biswanath -

dc.contributor.author Mondal, Sukumar -

dc.contributor.author Pal, Madhumangal -

dc.date.accessioned 2022-12-19T07:16:04Z -

dc.date.available 2022-12-19T07:16:04Z -

dc.date.issued 2017 -

dc.identifier.issn 1752-5055 -

dc.identifier.issn 1752-5063 -

dc.identifier.uri http://111.93.204.14:8080/xmlui/handle/123456789/1156 -

dc.description.abstract Let TIG be the tree corresponding to the weighted interval graph G = (V, E). In an inverse 1-centre location problem the parameter of an interval tree TIG corresponding to the weighted interval graph G = (V, E), like vertex weights have to be modified at minimum total cost such that a pre-specified vertex s ∈ V becomes the 1-centre of the interval graph G. In this paper, we present an O(n) time algorithm to find an inverse 1-centre location problem on the weighted tree TIG corresponding to the weighted interval graph, where the vertex weights can be changed within certain bounds and n is the number of vertices of the graph G. en_US

dc.language.iso en en_US

dc.publisher International Journal of Computing Science and Mathematics en_US

dc.subject Tree-networks en_US

dc.subject Centre location en_US

dc.subject 1-centre location en_US

dc.subject Inverse 1-centre location en_US

dc.subject Inverse optimisation en_US

dc.subject Interval graphs en_US

dc.title Computation of inverse 1-centre location problem on the weighted interval graphs en_US

dc.type Article en_US

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DC Field	Value	Language
dc.contributor.author	Jana, Biswanath	-
dc.contributor.author	Mondal, Sukumar	-
dc.contributor.author	Pal, Madhumangal	-
dc.date.accessioned	2022-12-19T07:16:04Z	-
dc.date.available	2022-12-19T07:16:04Z	-
dc.date.issued	2017	-
dc.identifier.issn	1752-5055	-
dc.identifier.issn	1752-5063	-
dc.identifier.uri	http://111.93.204.14:8080/xmlui/handle/123456789/1156	-
dc.description.abstract	Let TIG be the tree corresponding to the weighted interval graph G = (V, E). In an inverse 1-centre location problem the parameter of an interval tree TIG corresponding to the weighted interval graph G = (V, E), like vertex weights have to be modified at minimum total cost such that a pre-specified vertex s ∈ V becomes the 1-centre of the interval graph G. In this paper, we present an O(n) time algorithm to find an inverse 1-centre location problem on the weighted tree TIG corresponding to the weighted interval graph, where the vertex weights can be changed within certain bounds and n is the number of vertices of the graph G.	en_US
dc.language.iso	en	en_US
dc.publisher	International Journal of Computing Science and Mathematics	en_US
dc.subject	Tree-networks	en_US
dc.subject	Centre location	en_US
dc.subject	1-centre location	en_US
dc.subject	Inverse 1-centre location	en_US
dc.subject	Inverse optimisation	en_US
dc.subject	Interval graphs	en_US
dc.title	Computation of inverse 1-centre location problem on the weighted interval graphs	en_US
dc.type	Article	en_US
Appears in Collections:	Articles