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Apollonian Network


ApollonianNetwork

Connecting the centers of touching spheres in a three-dimensional Apollonian gasket by edges given a graph known as the Apollonian network. This process is illustrated above for the case of the planar Apollonian gasket. This network turns out to have some very special properties. In addition to being either deterministic or random, they are simultaneously scale-free, display small-world effects, can be embedded in a Euclidean lattice, and show space filling as well as matching graph properties. These networks describe force chains in granular packings, fragmented porous media, hierarchical road systems, and area-covering electrical supply networks (Andrade et al. 2005). Apollonian networks share many features of neuronal systems, and have been used to study the brain (Pellegrini et al. 2007).

ApollonianNetworkGraphs

The first few two-dimensional Apollonian networks are illustrated above. The order-two network has the connectivity of the Fano plane.

Apollonian network graphs are implemented in the Wolfram Language as GraphData[{"Apollonian", n}].

In the Season 4 episode "Hollywood Homicide" (2007) of the television crime drama NUMB3RS, Larry Fleinhardt voices his concern that some of the work done by math genius Charlie Eppes on the subject of Apollonian networks was a bit on the subjective side.


See also

Apollonian Gasket, Scale-Free Network, Triangulated Graph

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References

Andrade, J. S. Jr.; Herrmann, H. J.; Andrade, R. F. S.; 2 and da Silva, L. R. "Apollonian Networks: Simultaneously Scale-Free, Small World, Euclidean, Space Filling, and with Matching Graphs." Phys. Rev. Lett. 94, 01870-1-4, 2005.Boyd, D. W. "The Osculatory Packing of a Three Dimensional Sphere." Canad. J. Math. 25, 303-322, 1973.Pellegrini, G. L.; de Arcangelis, L.; Herrmann, H. J.; and Perrone-Capano, C. "Modelling the Brain as an Apollonian Network." Jan. 27, 2007. http://www.arxiv.org/abs/q-bio/0701045/.

Cite this as:

Weisstein, Eric W. "Apollonian Network." From MathWorld--A Wolfram Web Resource. https://mathworld.wolfram.com/ApollonianNetwork.html

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