Efficient Algorithms for Obnoxious Facility Location on a Line Segment or Circle
October 13, 2022 Β· Declared Dead Β· π arXiv.org
"No code URL or promise found in abstract"
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Authors
Bowei Zhang
arXiv ID
2210.07146
Category
cs.DS: Data Structures & Algorithms
Cross-listed
cs.CG
Citations
1
Venue
arXiv.org
Last Checked
4 months ago
Abstract
We study different restricted variations of the obnoxious facility location problem on a plane. The first is the constrained obnoxious facility location on a line segment (COFL-Line) problem. We provide an efficient algorithm for this problem that executes in $O(n ^ 2 \log k + n \log k \log (n^2 + k))$ time. Our result improves on the best known result of $O((nk)^2 \log(nk) + (n + k) \log (nk))$ time obtained by Singireddy and Basappa\cite{singireddy2022dispersing}. We also study the same problem where the facilities must be placed on a given circle (the constrained obnoxious facility location on a circle (COFL-Circ) problem). We provide an efficient algorithm for this problem that executes in $O(n ^ 2 \log k + n \log k \log (n^2 + k))$ time. Our result improves on the best known result of $O((nk)^2 \log(nk) + (n + k) \log (nk))$ time obtained by Singireddy and Basappa\cite{singireddy2022dispersing}. The third problem we study is the min-sum obnoxious facility location (MOFL) problem.We provide an efficient algorithm that executes in $O(nk\cdot Ξ±(nk) \log^3 {nk})$ time, where $Ξ±(.)$ is the inverse Ackermann function. The best known previous result is an $O(n^3k)$ time obtained by Singireddy and Basappa\cite{singireddy2022dispersing}.
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