@article {
author = {Motevalli, Samane and Fathali, Jafar and Zaferanieh, Mehdi},
title = {An efficient algorithm for finding the semi-obnoxious $(k,l)$-core of a tree},
journal = {Journal of Mathematical Modeling},
volume = {3},
number = {2},
pages = {129-144},
year = {2016},
publisher = {University of Guilan},
issn = {2345-394X},
eissn = {2382-9869},
doi = {},
abstract = {In this paper we study finding the $(k,l)$-core problem on a tree which the vertices have positive or negative weights. Let $T=(V,E)$ be a tree. The $(k,l)$-core of $T$ is a subtree with at most $k$ leaves and with a diameter of at most $l$ which the sum of the weighted distances from all vertices to this subtree is minimized. We show that, when the sum of the weights of vertices is negative, the $(k,l)$-core must be a single vertex. Then we propose an algorithm with time complexity of $O(n^2log n)$ for finding the $(k,l)$-core of a tree with pos/neg weight, which is in fact a modification of the one proposed by Becker et al. [Networks 40 (2002) 208].},
keywords = {Core,Facility location,Median subtree,Semi-obnoxious},
url = {https://jmm.guilan.ac.ir/article_1217.html},
eprint = {https://jmm.guilan.ac.ir/article_1217_decabc127c158c47e815e39eb31e5c64.pdf}
}