Approximation Ratio of the Min-Degree Greedy Algorithm for Maximum Independent Set on Interval and Chordal Graphs

Steven Chaplick; Martin Frohn; Steven Kelk; Johann Lottermoser; Matus Mihalak

doi:10.48550/arXiv.2403.10868

Approximation Ratio of the Min-Degree Greedy Algorithm for Maximum Independent Set on Interval and Chordal Graphs

Steven Chaplick, Martin Frohn, Steven Kelk, Johann Lottermoser, Matus Mihalak

Research output: Working paper / Preprint › Preprint

Abstract

In this article we prove that the minimum-degree greedy algorithm, with adversarial tie-breaking, is a 2/3-approximation for the Maximum Independent Set problem on interval graphs. We show that this is tight, even on unit interval graphs of maximum degree 3. We show that on chordal graphs, the greedy algorithm is a 1/2-approximation and that this is again tight. These results contrast with the known (tight) approximation ratio of $\frac{3}{\Delta+2}$ of the greedy algorithm for general graphs of maximum degree $\Delta$.

Original language	English
Publisher	Cornell University - arXiv
DOIs	https://doi.org/10.48550/arXiv.2403.10868
Publication status	Published - 16 Mar 2024

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Series	arXiv.org
Number	2403.10868
ISSN	2331-8422

Keywords

cs.DS

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10.48550/arXiv.2403.10868

1 Article

Approximation ratio of the min-degree greedy algorithm for Maximum Independent Set on interval and chordal graphs
Chaplick, S., Frohn, M., Kelk, S., Lottermoser, J. & Mihalák, M., 15 Jan 2025, In: Discrete Applied Mathematics. 360, p. 275-281 7 p.
Research output: Contribution to journal › Article › Academic › peer-review

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abstract = " In this article we prove that the minimum-degree greedy algorithm, with adversarial tie-breaking, is a 2/3-approximation for the Maximum Independent Set problem on interval graphs. We show that this is tight, even on unit interval graphs of maximum degree 3. We show that on chordal graphs, the greedy algorithm is a 1/2-approximation and that this is again tight. These results contrast with the known (tight) approximation ratio of $\frac{3}{\Delta+2}$ of the greedy algorithm for general graphs of maximum degree $\Delta$. ",

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AU - Frohn, Martin

AU - Kelk, Steven

AU - Lottermoser, Johann

AU - Mihalak, Matus

N1 - 11 pages, 2 figures, submitted to journal

PY - 2024/3/16

Y1 - 2024/3/16

N2 - In this article we prove that the minimum-degree greedy algorithm, with adversarial tie-breaking, is a 2/3-approximation for the Maximum Independent Set problem on interval graphs. We show that this is tight, even on unit interval graphs of maximum degree 3. We show that on chordal graphs, the greedy algorithm is a 1/2-approximation and that this is again tight. These results contrast with the known (tight) approximation ratio of $\frac{3}{\Delta+2}$ of the greedy algorithm for general graphs of maximum degree $\Delta$.

AB - In this article we prove that the minimum-degree greedy algorithm, with adversarial tie-breaking, is a 2/3-approximation for the Maximum Independent Set problem on interval graphs. We show that this is tight, even on unit interval graphs of maximum degree 3. We show that on chordal graphs, the greedy algorithm is a 1/2-approximation and that this is again tight. These results contrast with the known (tight) approximation ratio of $\frac{3}{\Delta+2}$ of the greedy algorithm for general graphs of maximum degree $\Delta$.

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M3 - Preprint

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BT - Approximation Ratio of the Min-Degree Greedy Algorithm for Maximum Independent Set on Interval and Chordal Graphs

PB - Cornell University - arXiv

ER -

Approximation Ratio of the Min-Degree Greedy Algorithm for Maximum Independent Set on Interval and Chordal Graphs

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Approximation ratio of the min-degree greedy algorithm for Maximum Independent Set on interval and chordal graphs

Cite this