Spectral dimensions for one-dimensional critical long-range percolation
Abstract
Consider the critical long-range percolation on Z, where an edge connects i and j independently with probability 1-\-β∫ii+1∫jj+1|u-v|-2d ud v\ for |i-j|>1 for some fixed β>0 and with probability 1 for |i-j|=1. We prove that both the quenched and annealed spectral dimensions of the associated simple random walk are 2/(1+δ), where δ∈ (0,1) is the exponent of the effective resistance in the LRP model, as derived in [10, Theorem 1.1]. Our work addresses an open question from [7, Section 5].
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