Biased random walk on a graph explained

In network science, a biased random walk on a graph is a time path process in which an evolving variable jumps from its current state to one of various potential new states; unlike in a pure random walk, the probabilities of the potential new states are unequal.

Biased random walks on a graph provide an approach for the structural analysis of undirected graphs in order to extract their symmetries when the network is too complex or when it is not large enough to be analyzed by statistical methods. The concept of biased random walks on a graph has attracted the attention of many researchers and data companies over the past decade especially in the transportation and social networks.[1]

Model

There have been written many different representations of the biased random walks on graphs based on the particular purpose of the analysis. A common representation of the mechanism for undirected graphs is as follows:[2]

On an undirected graph, a walker takes a step from the current node,

j,

to node

i.

Assuming that each node has an attribute

\alphai,

the probability of jumping from node

j

to

i

is given by:
\alpha=\alphaiAij
\sumk\alphakAkj
T
ij

,

where

Aij

represents the topological weight of the edge going from

j

to

i.

In fact, the steps of the walker are biased by the factor of

\alpha

which may differ from one node to another.[3]

Depending on the network, the attribute

\alpha

can be interpreted differently. It might be implied as the attraction of a person in a social network, it might be betweenness centrality or even it might be explained as an intrinsic characteristic of a node. In case of a fair random walk on graph

\alpha

is one for all the nodes.

In case of shortest paths random walks[4]

\alphai

is the total number of the shortest paths between all pairs of nodes that pass through the node

i

. In fact the walker prefers the nodes with higher betweenness centrality which is defined as below:

C(i)=\tfrac{Totalnumberofshortestpathsthroughi}{Totalnumberofshortestpaths

}

Based on the above equation, the recurrence time to a node in the biased walk is given by:[5]

r
i=1
C(i)

Applications

There are a variety of applications using biased random walks on graphs. Such applications include control of diffusion,[6] advertisement of products on social networks,[7] explaining dispersal and population redistribution of animals and micro-organisms,[8] community detections,[9] wireless networks,[10] and search engines.[11]

See also

External links

Notes and References

  1. Roberta Sinatra . . Renaud Lambiotte . Vincenzo Nicosia . Vito Latora. Maximal-entropy random walks in complex networks with limited information. Roberta Sinatra. Physical Review E. March 2011. 10.1103/PhysRevE.83.030103 . 21517435. 83. 3. 030103. 1007.4936. 2011PhRvE..83c0103S. 6984660.
  2. J. Gómez-Gardeñes . V. Latora. Entropy rate of diffusion processes on complex networks. Physical Review E. Dec 2008 . 10.1103/PhysRevE.78.065102 . 19256892. 78. 6. 065102. 0712.0278. 2008PhRvE..78f5102G. 14100937.
  3. R. Lambiotte . R. Sinatra . J.-C. Delvenne . T.S. Evans . M. Barahona . V. Latora. Flow graphs: interweaving dynamics and structure. Physical Review E. Dec 2010. 10.1103/PhysRevE.84.017102. 21867345. 84. 1. 017102. 1012.1211. 2011PhRvE..84a7102L. 2286264.
  4. Book: Blanchard, P . Volchenkov, D. Mathematical Analysis of Urban Spatial Networks. 2008. 10.1007/978-3-540-87829-2. Springer . 978-3-540-87828-5 . ResearchGate.
  5. Book: Volchenkov D . Blanchard P. Fair and biased random walks on undirected graphs and related entropies. 2011. Birkhäuser. 380. 978-0-8176-4903-6.
  6. Book: Chung, Zhao. Fan, Wenbo. PageRank and Random Walks on Graphs. Fete of Combinatorics and Computer Science . 2010. 10.1007/978-3-642-13580-4_3. 43–62. Bolyai Society Mathematical Studies. 20. 978-3-642-13579-8. 10.1.1.157.7116. 3207094.
  7. Book: Adal, K.M.. Biased random walk based routing for mobile ad hoc networks. 1–6. June 2010. 10.1109/ICIAS.2010.5716181. 978-1-4244-6623-8. 2010 International Conference on Intelligent and Advanced Systems. 16113377.
  8. Kakajan Komurov . Michael A. White . Prahlad T. Ram. Use of Data-Biased Random Walks on Graphs for the Retrieval of Context-Specific Networks from Genomic Data. PLOS Comput Biol. Aug 2010 . 2924243 . 20808879. 10.1371/journal.pcbi.1000889. 6. 8. e1000889. 2010PLSCB...6E0889K . free .
  9. J.K. Ochab . Z. Burda. Maximal entropy random walk in community detection. The European Physical Journal Special Topics. Jan 2013. 10.1140/epjst/e2013-01730-6. 216. 73–81. 1208.3688. 2013EPJST.216...73O. 56409069.
  10. Beraldi . Roberto. Biased Random Walks in Uniform Wireless Networks. IEEE Transactions on Mobile Computing. 8. 4. 500–513. Apr 2009. 10.1109/TMC.2008.151. 13521325.
  11. Da-Cheng Nie . Zi-Ke Zhang . Qiang Dong . Chongjing Sun . Yan Fu. Information Filtering via Biased Random Walk on Coupled Social Network. The Scientific World Journal. 2014. 829137. July 2014. 10.1155/2014/829137. 25147867. 4132410. free.