On the impossibility of detecting a late change-point in the preferential attachment random graph model
Abstract
We consider the problem of late change-point detection under the preferential attachment random graph model with time dependent attachment function. This can be formulated as a hypothesis testing problem where the null hypothesis corresponds to a preferential attachment model with a constant affine attachment parameter δ0 and the alternative corresponds to a preferential attachment model where the affine attachment parameter changes from δ0 to δ1 at a time τn = n - n where 0≤ n ≤ n and n is the size of the graph. It was conjectured in Bet et al. that when observing only the unlabeled graph, detection of the change is not possible for n = o(n1/2). In this work, we make a step towards proving the conjecture by proving the impossibility of detecting the change when n = o(n1/3). We also study change-point detection in the case where the labeled graph is observed and show that change-point detection is possible if and only if n ∞, thereby exhibiting a strong difference between the two settings.
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