Ramanujan Property and Edge Universality of Random Regular Graphs

Abstract

We consider the normalized adjacency matrix of a random d-regular graph on N vertices with any fixed degree d≥ 3 and denote its eigenvalues as λ1=d/d-1≥ λ2≥λ3·s≥ λN. We establish the following two results as N→ ∞. (i) With high probability, all eigenvalues are optimally rigid, up to an additional N o(1) factor. Specifically, the fluctuations of bulk eigenvalues are bounded by N-1+ o(1), and the fluctuations of edge eigenvalues are bounded by N-2/3+ o(1). (ii) Edge universality holds for random d-regular graphs. That is, the distributions of λ2 and -λN converge to the Tracy-Widom1 distribution associated with the Gaussian Orthogonal Ensemble. As a consequence, for sufficiently large N, approximately 69\% of d-regular graphs on N vertices are Ramanujan, meaning \λ2,|λN|\≤ 2.

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