Percolative properties of the random coprime colouring
Abstract
Given u and v in Zd, say that u is visible from v if the segment from u to v contains exactly two elements, which are u and v. Take X "uniformly at random in Zd" and colour each vertex u of Zd in white if u is visible from X and in black otherwise. Previous independent works of Pleasants-Huck and of the third author give a precise meaning to this definition. This paper is dedicated to the study of this random colouring from the point of view of percolation theory: given a reasonable graph structure on Zd, how many infinite black (resp. white) connected components are there?
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