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Introduction to Network Science 1
Random Models
Introduction to Network Science 2
mean degree in a graph with exactly m edges
Taylor series reminder:
Introduction to Network Science 3
In contrast to the degree distribution in random model …
Introduction to Network Science 4
In contrast to the degree distribution in random model …
Introduction to Network Science 5
Newman, “Random graphs as models of networks”
Introduction to Network Science 6
Q: When p=0 then |gc|=1; when p=1 then |gc|=n. What is the difference between them?
Co-authorship network its largest connected component
Introduction to Network Science 7
Q: When p=0 then |gc|=1; when p=1 then |gc|=n. Is this transition smooth? Is there a point of transition?
i does not belong to gc if for every node j either
a) there is no edge ij, prob =
b) there is edge ij but j is not in giant component, prob =
vertices in giant component
1-p
pu
Introduction to Network Science 8
Newman “Networks, An Introduction” => Demo in Matlab
Introduction to Network Science 9
Introduction to Network Science 10
Introduction to Network Science 11
Conclusion: In the limit of large n, the probability of existence of two separate giant components goes to zero.
large
Introduction to Network Science 12
fraction of nodes in gc
edges in tree edge prob
the component is still tree
Introduction to Network Science 13
Kronecker delta
Introduction to Network Science 14
see handout, pp 412-413
Average size of the small components in a random model does not grow with the number of vertices. Average component size
Introduction to Network Science 15
Distribution of component sizes
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