The time constant for Bernoulli percolation is Lipschitz continuous strictly above pc
Abstract
We consider the standard model of i.i.d. first passage percolation on Zd given a distribution G on [0,+∞] (+∞ is allowed). When G([0,+∞]) < pc(d), it is known that the time constant μG exists. We are interested in the regularity properties of the map GμG. We first study the specific case of distributions of the form Gp=pδ1+(1-p)δ∞ for p>pc(d). In this case, the travel time between two points is equal to the length of the shortest path between the two points in a bond percolation of parameter p. We show that the function p μGp is Lipschitz continuous on every interval [p0,1], where p0>pc(d).
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