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Paper detail

On the continuous-time limit of the Barabási-Albert random graph

We prove that the Barabási-Albert model converges weakly to a set of generalized Yule models via an appropriate scaling. To pursue this aim we superimpose to its graph structure a suitable set of processes that we call the planted model and we introduce an ad-hoc sampling procedure. The use of the obtained limit process represents an alternative and advantageous way of looking at some of the asymptotic properties of the Barabási-Albert random graph.

preprint2020arXivOpen access
Angelica PachonFederico PolitoLaura Sacerdote
math.COmath.PR
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Angelica PachonFederico PolitoLaura Sacerdote

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