Fluctuations of the giant of Poisson random graphs
Abstract
Enriquez, Faraud, and Lemaire (2023) have established process-level fluctuations for the giant of the dynamic Erdos-R\'enyi random graph above criticality and show that the limit is a centered Gaussian process with continuous sample paths. A random walk proof was recently obtained by Corujo, Limic and Lemaire (2024). We show that a similar result holds for rank-one inhomogeneous models whenever the empirical weight distribution converges to a limit and its second moment converges as well.
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