Fluctuations of functions of sparse Erdos-R\'enyi graphs
Abstract
Let A be the (rescaled) adjacency matrix of the Erdos-R\'enyi graphs G(N,p). For N-1+τ ≤slant p≤slant N-τ, we study the fluctuation of f(A)ii on the global and mesoscopic spectral scales. We show that the distribution of f(A)ii is asymptotically the sum of two independent Gaussian random variables on different scales, where a phase transition occurs on the spectral scale p.
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