File:Swlc.png
Summary
Clustering coefficient $C$ and mean geodesic distance $\ell$ between nodes in the Newman-Watts variant of the Watts-Strogatz small-world model as a function of rewiring probability $p$. Observe that there is a regime with high clustering but low mean geodesic distance. The clustering coefficient $C \in [0,1]$, as one obtains $C = 1$ for a complete graph with $N \geq 3$ nodes. This figure, which appeared in (Newman, 2003), is used with permission from Mark Newman and SIAM. Copyright © 2003 Society for Industrial and Applied Mathematics. Reused with permission. All rights reserved. All rights reserved. Permission obtained by Mason A. Porter for the Small-world network article.)
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| Date/Time | Thumbnail | Dimensions | User | Comment | |
|---|---|---|---|---|---|
| current | 02:44, 20 January 2012 | | 1,005 × 768 (39 KB) | Serguei A. Mokhov (Talk | contribs) | Clustering coefficient $C$ and mean geodesic distance $\ell$ between nodes in the Newman-Watts variant of the Watts-Strogatz small-world model as a function of rewiring probability $p$. Observe that there is a regime with high clustering but low mean geo |
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