Local probabilities of randomly stopped sums of power law lattice random variables
Abstract
Let X1 and N 0 be integer valued power law random variables. For a randomly stopped sum SN=X1+·s+XN of independent and identically distributed copies of X1 we establish a first order asymptotics of the local probabilities P(SN=t) as t+∞. Using this result we show the k-δ, 0 δ 1 scaling of the local clustering coefficient (of a randomly selected vertex of degree k) in a power law affiliation network.
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