Juliann Opitz, Robert D. Allen, et al.
Microlithography 1998
We consider the following long-range percolation model: an undirected graph with the node set {0, 1, ..., N}d, has edges (x, y) selected with probability ≈ β/||x - y||s if ||x - y|| > 1, and with probability 1 if ||x - y|| = 1, for some parameters β, s > 0. This model was introduced by Benjamini and Berger, who obtained bounds on the diameter of this graph for the one-dimensional case d = 1 and for various values of s, but left cases s = 1, 2 open. We show that, with high probability, the diameter of this graph is Θ(log N/log log N) when s = d, and, for some constants 0 < η1 < η2 < 1, it is at most Nη2 when s = 2d, and is at least Nη1 when d = 1, s = 2, β < 1 or when s > 2d. We also provide a simple proof that the diameter is at most logO(1) N with high probability, when d < s < 2d, established previously in [2]. © 2002 Wiley Periodicals, Inc.
Juliann Opitz, Robert D. Allen, et al.
Microlithography 1998
Paul J. Steinhardt, P. Chaudhari
Journal of Computational Physics
Don Coppersmith, Ephraim Feig, et al.
IEEE TSP
Matthew A Grayson
Journal of Complexity