Lack of Hyperbolicity in Asymptotic Erd\"os--Renyi Sparse Random Graphs
Abstract
In this work we prove that the giant component of the Erd\"os--Renyi random graph G(n,c/n) for c a constant greater than 1 (sparse regime), is not Gromov δ-hyperbolic for any positive δ with probability tending to one as n∞. As a corollary we provide an alternative proof that the giant component of G(n,c/n) when c>1 has zero spectral gap almost surely as n∞.
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