Sublinear distance labeling

Stephen Alstrup; Søren Dahlgaard; Mathias Bæk Tejs Knudsen; Ely Porat

doi:10.4230/LIPIcs.ESA.2016.5

Sublinear distance labeling

Stephen Alstrup, Søren Dahlgaard, Mathias Bæk Tejs Knudsen, Ely Porat

Department of Computer Science

2 Citations (Scopus)

93 Downloads (Pure)

Abstract

A distance labeling scheme labels the n nodes of a graph with binary strings such that, given the labels of any two nodes, one can determine the distance in the graph between the two nodes by looking only at the labels. A D-preserving distance labeling scheme only returns precise distances between pairs of nodes that are at distance at least D from each other. In this paper we consider distance labeling schemes for the classical case of unweighted and undirected graphs. We present a O(n/D log² D) bit D-preserving distance labeling scheme, improving the previous bound by Bollobás et al. [SIAM J. Discrete Math. 2005]. We also give an almost matching lower bound of Ω(n/D). With our D-preserving distance labeling scheme as a building block, we additionally achieve the following results: 1. We present the first distance labeling scheme of size o(n) for sparse graphs (and hence bounded degree graphs). This addresses an open problem by Gavoille et al. [J. Algo. 2004], hereby separating the complexity from distance labeling in general graphs which require Ω(n) bits, Moon [Proc. of Glasgow Math. Association 1965].¹ For approximate r-additive labeling schemes, that return distances within an additive error of r we show a scheme of size O(n/r · polylog(r log n/log n) for r ≥ 2. This improves on the current best bound of O (n/r) by Alstrup et. al. [SODA 2016] for sub-polynomial r, and is a generalization of a result by Gawrychowski et al. [arXiv preprint 2015] who showed this for r = 2.

Original language	English
Title of host publication	24th Annual European Symposium on Algorithms (ESA 2016)
Editors	Piotr Sankowski, Christos Zaroliagis
Number of pages	15
Publisher	Schloss Dagstuhl - Leibniz-Zentrum für Informatik
Publication date	1 Aug 2016
Article number	5
ISBN (Print)	978-3-95977-015-6
DOIs	https://doi.org/10.4230/LIPIcs.ESA.2016.5
Publication status	Published - 1 Aug 2016
Event	24th Annual European Symposium on Algorithms - Århus, Denmark Duration: 22 Aug 2016 → 26 Aug 2016 Conference number: 24

Conference

Conference	24th Annual European Symposium on Algorithms
Number	24
Country/Territory	Denmark
City	Århus
Period	22/08/2016 → 26/08/2016

Series	Leibniz International Proceedings in Informatics
Volume	57
ISSN	1868-8969

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Sublinear distance labeling. / Alstrup, Stephen; Dahlgaard, Søren; Knudsen, Mathias Bæk Tejs et al.

24th Annual European Symposium on Algorithms (ESA 2016). ed. / Piotr Sankowski; Christos Zaroliagis. Schloss Dagstuhl - Leibniz-Zentrum für Informatik, 2016. 5 (Leibniz International Proceedings in Informatics, Vol. 57).

Research output: Chapter in Book/Report/Conference proceeding › Article in proceedings › Research › peer-review

Alstrup, S, Dahlgaard, S, Knudsen, MBT & Porat, E 2016, Sublinear distance labeling. in P Sankowski & C Zaroliagis (eds), 24th Annual European Symposium on Algorithms (ESA 2016)., 5, Schloss Dagstuhl - Leibniz-Zentrum für Informatik, Leibniz International Proceedings in Informatics, vol. 57, 24th Annual European Symposium on Algorithms, Århus, Denmark, 22/08/2016. https://doi.org/10.4230/LIPIcs.ESA.2016.5

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abstract = "A distance labeling scheme labels the n nodes of a graph with binary strings such that, given the labels of any two nodes, one can determine the distance in the graph between the two nodes by looking only at the labels. A D-preserving distance labeling scheme only returns precise distances between pairs of nodes that are at distance at least D from each other. In this paper we consider distance labeling schemes for the classical case of unweighted and undirected graphs. We present a O(n/D log2 D) bit D-preserving distance labeling scheme, improving the previous bound by Bollob{\'a}s et al. [SIAM J. Discrete Math. 2005]. We also give an almost matching lower bound of Ω(n/D). With our D-preserving distance labeling scheme as a building block, we additionally achieve the following results: 1. We present the first distance labeling scheme of size o(n) for sparse graphs (and hence bounded degree graphs). This addresses an open problem by Gavoille et al. [J. Algo. 2004], hereby separating the complexity from distance labeling in general graphs which require Ω(n) bits, Moon [Proc. of Glasgow Math. Association 1965].1 For approximate r-additive labeling schemes, that return distances within an additive error of r we show a scheme of size O(n/r · polylog(r log n/log n) for r ≥ 2. This improves on the current best bound of O (n/r) by Alstrup et. al. [SODA 2016] for sub-polynomial r, and is a generalization of a result by Gawrychowski et al. [arXiv preprint 2015] who showed this for r = 2.",

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AU - Alstrup, Stephen

AU - Dahlgaard, Søren

AU - Knudsen, Mathias Bæk Tejs

AU - Porat, Ely

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N2 - A distance labeling scheme labels the n nodes of a graph with binary strings such that, given the labels of any two nodes, one can determine the distance in the graph between the two nodes by looking only at the labels. A D-preserving distance labeling scheme only returns precise distances between pairs of nodes that are at distance at least D from each other. In this paper we consider distance labeling schemes for the classical case of unweighted and undirected graphs. We present a O(n/D log2 D) bit D-preserving distance labeling scheme, improving the previous bound by Bollobás et al. [SIAM J. Discrete Math. 2005]. We also give an almost matching lower bound of Ω(n/D). With our D-preserving distance labeling scheme as a building block, we additionally achieve the following results: 1. We present the first distance labeling scheme of size o(n) for sparse graphs (and hence bounded degree graphs). This addresses an open problem by Gavoille et al. [J. Algo. 2004], hereby separating the complexity from distance labeling in general graphs which require Ω(n) bits, Moon [Proc. of Glasgow Math. Association 1965].1 For approximate r-additive labeling schemes, that return distances within an additive error of r we show a scheme of size O(n/r · polylog(r log n/log n) for r ≥ 2. This improves on the current best bound of O (n/r) by Alstrup et. al. [SODA 2016] for sub-polynomial r, and is a generalization of a result by Gawrychowski et al. [arXiv preprint 2015] who showed this for r = 2.

AB - A distance labeling scheme labels the n nodes of a graph with binary strings such that, given the labels of any two nodes, one can determine the distance in the graph between the two nodes by looking only at the labels. A D-preserving distance labeling scheme only returns precise distances between pairs of nodes that are at distance at least D from each other. In this paper we consider distance labeling schemes for the classical case of unweighted and undirected graphs. We present a O(n/D log2 D) bit D-preserving distance labeling scheme, improving the previous bound by Bollobás et al. [SIAM J. Discrete Math. 2005]. We also give an almost matching lower bound of Ω(n/D). With our D-preserving distance labeling scheme as a building block, we additionally achieve the following results: 1. We present the first distance labeling scheme of size o(n) for sparse graphs (and hence bounded degree graphs). This addresses an open problem by Gavoille et al. [J. Algo. 2004], hereby separating the complexity from distance labeling in general graphs which require Ω(n) bits, Moon [Proc. of Glasgow Math. Association 1965].1 For approximate r-additive labeling schemes, that return distances within an additive error of r we show a scheme of size O(n/r · polylog(r log n/log n) for r ≥ 2. This improves on the current best bound of O (n/r) by Alstrup et. al. [SODA 2016] for sub-polynomial r, and is a generalization of a result by Gawrychowski et al. [arXiv preprint 2015] who showed this for r = 2.

U2 - 10.4230/LIPIcs.ESA.2016.5

DO - 10.4230/LIPIcs.ESA.2016.5

M3 - Article in proceedings

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T3 - Leibniz International Proceedings in Informatics

BT - 24th Annual European Symposium on Algorithms (ESA 2016)

A2 - Sankowski, Piotr

A2 - Zaroliagis, Christos

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T2 - 24th Annual European Symposium on Algorithms

Y2 - 22 August 2016 through 26 August 2016

ER -

Sublinear distance labeling

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