Long-range percolation on the hierarchical lattice
Abstract
We study long-range percolation on the hierarchical lattice of order N, where any edge of length k is present with probability pk=1-(-β-k α), independently of all other edges. For fixed β, we show that the critical value αc(β) is non-trivial if and only if N < β < N2. Furthermore, we show uniqueness of the infinite component and continuity of the percolation probability and of αc(β) as a function of β. This means that the phase diagram of this model is well understood.
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