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Efficient routeing in Poisson small-world networks

Published online by Cambridge University Press:  14 July 2016

M. Draief*
Affiliation:
University of Cambridge
A. Ganesh*
Affiliation:
Microsoft Research
*
Postal address: Statistical Laboratory, Centre for Mathematical Sciences, University of Cambridge, Wilberforce Road, Cambridge CB3 0WB, UK. Email address: [email protected]
∗∗Postal address: Microsoft Research, 7 J J Thomson Avenue, Cambridge CB3 0FB, UK. Email address: [email protected]
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Abstract

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In a recent paper, Kleinberg (2000) considered a small-world network model consisting of a d-dimensional lattice augmented with shortcuts. The probability of a shortcut being present between two points decays as a power, r, of the distance, r, between them. Kleinberg showed that greedy routeing is efficient if α = d and that there is no efficient decentralised routeing algorithm if α ≠ d. The results were extended to a continuum model by Franceschetti and Meester (2003). In our work, we extend the result to more realistic models constructed from a Poisson point process wherein each point is connected to all its neighbours within some fixed radius, and possesses random shortcuts to more distant nodes as described above.

Type
Research Article
Copyright
© Applied Probability Trust 2006 

References

Barbour, A. D. and Reinert, G. (2001). Small worlds. Random Structures Algorithms 19, 5474.CrossRefGoogle Scholar
Benjamini, I. and Berger, N. (2001). The diameter of long-range percolation clusters on finite cycles. Random Structures Algorithms 19, 102111.CrossRefGoogle Scholar
Benjamini, I., Kesten, H., Peres, Y. and Schramm, O. (2004). Geometry of the uniform spanning forest: transitions in dimensions 4,8,12,…. Ann. Math. 160, 465491.CrossRefGoogle Scholar
Coppersmith, D., Gamarnik, D. and Sviridenko, M. (2002). The diameter of a long-range percolation graph. Random Structures Algorithms 21, 113.CrossRefGoogle Scholar
Erdős, P. and Rényi, A. (1959). On random graphs. I. Publ. Math. Debrecen 6, 290297.CrossRefGoogle Scholar
Franceschetti, M. and Meester, R. (2003). Navigation in small world networks, a scale-free continuum model. Tech. Rep. UCB/ERL M03/33, EECS Department, University of California, Berkeley.Google Scholar
Kleinberg, J. (2000). The small-world phenomenon: an algorithmic perspective. In Proc. 32nd Annual ACM Symp. Theory Comput., ACM, New York, pp. 163170.Google Scholar
Milgram, S. (1967). The small world problem. Psychology Today 2, 6067.Google Scholar
Penrose, M. (2003). Random Geometric Graphs. Oxford University Press.CrossRefGoogle Scholar
Sharma, G. and Mazumdar, R. R. (2005). Hybrid sensor networks: a small world. In Proc. 6th ACM Internat. Symp. Mobile Ad Hoc Networking Comput., ACM, New York, pp. 366377.Google Scholar
Watts, D. J. and Strogatz, S. H. (1967). Collective dynamics of small world networks. Nature 393, 440442.CrossRefGoogle Scholar