Plane and Planarity Thresholds for Random Geometric Graphs

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A random geometric graph, G(n, r), is formed by choosing n points independently and uniformly at random in a unit square; two points are connected by a straight-line edge if they are at Euclidean distance at most r. For a given constant k, we show that n −k 2k−2 is a distance threshold function for G(n, r) to have a connected subgraph on k points. Based on that, we show that n−2/3 is a distance threshold function for G(n, r) to be plane, and n−5/8 is a distance threshold function for G(n, r) to be planar.

Ahmad Biniaz, Evangelos Kranakis, Anil Maheshwari,

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ALGOSENSORS 2015 | Sensor Networks |

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Added	15 Apr 2016
Updated	15 Apr 2016
Type	Journal
Year	2015
Where	ALGOSENSORS
Authors	Ahmad Biniaz, Evangelos Kranakis, Anil Maheshwari, Michiel H. M. Smid

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Plane and Planarity Thresholds for Random Geometric Graphs

ALGOSENSORS 2015 | Sensor Networks |

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