Weighted Maximum Independent Set of Geometric Objects in Turnstile Streams
February 27, 2019 Β· Declared Dead Β· π International Workshop and International Workshop on Approximation, Randomization, and Combinatorial Optimization. Algorithms and Techniques
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Authors
Ainesh Bakshi, Nadiia Chepurko, David P. Woodruff
arXiv ID
1902.10328
Category
cs.DS: Data Structures & Algorithms
Cross-listed
cs.CG
Citations
7
Venue
International Workshop and International Workshop on Approximation, Randomization, and Combinatorial Optimization. Algorithms and Techniques
Last Checked
4 months ago
Abstract
We study the Maximum Independent Set problem for geometric objects given in the data stream model. A set of geometric objects is said to be independent if the objects are pairwise disjoint. We consider geometric objects in one and two dimensions, i.e., intervals and disks. Let $Ξ±$ be the cardinality of the largest independent set. Our goal is to estimate $Ξ±$ in a small amount of space, given that the input is received as a one-pass stream. We also consider a generalization of this problem by assigning weights to each object and estimating $Ξ²$, the largest value of a weighted independent set. We initialize the study of this problem in the turnstile streaming model (insertions and deletions) and provide the first algorithms for estimating $Ξ±$ and $Ξ²$. For unit-length intervals, we obtain a $(2+Ξ΅)$-approximation to $Ξ±$ and $Ξ²$ in poly$(\frac{\log(n)}Ξ΅)$ space. We also show a matching lower bound. Combined with the $3/2$-approximation for insertion-only streams by Cabello and Perez-Lanterno [CP15], our result implies a separation between the insertion-only and turnstile model. For unit-radius disks, we obtain a $\left(\frac{8\sqrt{3}}Ο\right)$-approximation to $Ξ±$ and $Ξ²$ in poly$(\log(n), Ξ΅^{-1})$ space, which is closely related to the hexagonal circle packing constant. We provide algorithms for estimating $Ξ±$ for arbitrary-length intervals under a bounded intersection assumption and study the parameterized space complexity of estimating $Ξ±$ and $Ξ²$, where the parameter is the ratio of maximum to minimum interval length.
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