Triangle Percolation on the Grid

Abstract

We consider a geometric percolation process partially motivated by recent work of Hejda and Kala. Specifically, we start with an initial set X ⊂eq Z2, and then iteratively check whether there exists a triangle T ⊂eq R2 with its vertices in Z2 such that T contains exactly four points of Z2 and exactly three points of X. In this case, we add the missing lattice point of T to X, and we repeat until no such triangle exists. We study the limit sets S, the sets stable under this process, including determining their possible densities and some of their structure.