Asymptotic diameter of preferential attachment model
Abstract
We study the asymptotic diameter of the preferential attachment model PA\!n(m,δ) with parameters m 2 and δ > 0. Building on the recent work VZ25, we prove that the diameter of Gn PA\!n(m,δ) is (1+o(1)) n with high probability, where is the exponential growth rate of the local weak limit of Gn. Our result confirms the conjecture in VZ25 and closes the remaining gap in understanding the asymptotic diameter of preferential attachment graphs with general parameters m 1 and δ >-m. Our proof follows a general recipe that relates the diameter of a random graph to its typical distance, which we expect to have applicability in a broader range of models.
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