Percolation of words on d with long range connections

Abstract

Consider an independent site percolation model on d, with parameter p ∈ (0,1), where all long range connections in the axes directions are allowed. In this work we show that given any parameter p, there exists and integer K(p) such that all binary sequences (words) ∈ \0,1\ can be seen simultaneously, almost surely, even if all connections whose length is bigger than K(p) are suppressed. We also show some results concerning the question how K(p) should scale with p when p goes to zero. Related results are also obtained for the question of whether or not almost all words are seen.