Spectral properties of the Laplacian of Scale-Free Percolation models
Abstract
We consider scale-free percolation on a discrete torus VN of size N. Conditionally on an i.i.d. sequence of Pareto weights (Wi)i∈ VN with tail exponent τ-1>0, we connect any two points i and j on the torus with probability pij= WiWj\|i-j\|α 1 for some parameter α>0. We focus on the (centred) Laplacian operator of this random graph and study its empirical spectral distribution. We explicitly identify the limiting distribution when α<1 and τ>3, in terms of the spectral distribution of some non-commutative unbounded operators.
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