Spectral gap and embedded trees for the Laplacian of the Erdos-R\'enyi graph
Abstract
For the Erdos-R\'enyi graph of size N with mean degree (1+o(1)) Nt+1≤ d≤(1-o(1)) Nt where t∈N*, with high probability the smallest non zero eigenvalue of the Laplacian is equal to 2-2(π(2t+1)-1)+o(1). This eigenvalue arises from a small subgraph isomorphic to a line of size t linked to the giant connected component by only one edge.
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