Truncated long-range percolation of words on the square lattice
Abstract
We study mixed long-range percolation on the square lattice. Each vertical edge of unit length is independently open with probability , and each horizontal edge of length i is independently open with probability pi. Also, each vertex is assigned independently a random variable taking values 1 and 0 with probability p and 1-p, respectively. We prove that for a broad class of anisotropic long-range percolation models for which connection probabilities pi satisfy some regularity conditions, all words (semi-infinite binary sequences) are seen simultaneously from the origin with positive probability, even if all edges with length larger than some constant (depending on , p, and on the sequence (pi)) are suppressed.
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