Spectral gap and edge universality of dense random regular graphs
Abstract
Let A be the adjacency matrix of a random d-regular graph on N vertices, and we denote its eigenvalues by λ1≥ λ2·s ≥ λN. For N2/3 d≤ N/2, we prove optimal rigidity estimates of the extreme eigenvalues of A, which in particular imply that \[ \|λN|,λ2\ <2d-1 \] with overwhelming probability. In the same regime of d, we also show that \[ N2/3(λ2+d/Nd(N-d)/N-2) d TW1\,, \]where TW1 is the Tracy-Widom distribution for GOE; analogues results also hold for other non-trivial extreme eigenvalues.
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