Asymptotics for first-passage percolation on logarithmic subgraphs of Z2
Abstract
For a>0 and b ≥ 0, let Ga,b be the subgraph of Z2 induced by the vertices between the first coordinate axis and the graph of the function f = fa,b(u) = a (1+u) + b (1+(1+u)), u ≥ 0. It is known that for a>0, the critical value for Bernoulli percolation on Gf = Ga,b is strictly between 1/2 and 1, and that if b>2a then the percolation phase transition is discontinuous. We study first-passage percolation (FPP) on Ga,b with i.i.d. edge-weights (τe) satisfying p = P(τe=0) ∈ [1/2,1) and the "gap condition" P(τe ≤ δ) = p for some δ>0. We find the rate of growth of the expected passage time in Gf from the origin to the line x=n, and show that, while when p=1/2 it is of order n/(a n), when p>1/2 it can be of order (a) nc1/( n)c2, (b) ( n)c3, (c) n, or (d) constant, depending on the relationship between a,b, and p. For more general functions f, we prove a central limit theorem for the passage time and show that its variance grows at the same rate as the mean. As a consequence of our methods, we improve the percolation transition result by showing that the phase transition on Ga,b is discontinuous if and only if b > a, and improve "sponge crossing dimensions" asymptotics from the '80s on subcritical percolation crossing probabilities for tall thin rectangles.
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