Catalan percolation

Abstract

In Catalan percolation, all nearest-neighbor edges \i,i+1\ along Z are initially occupied, and all other edges are open independently with probability p. Open edges \i,j\ are occupied if some pair of edges \i,k\ and \k,j\, with i<k<j, become occupied. This model was introduced by Gravner and the third author, in the context of polluted graph bootstrap percolation. We prove that the critical p c is strictly between that of oriented site percolation on Z2 and the Catalan growth rate 1/4. Our main result shows that an enhanced oriented percolation model, with non-decaying infinite-range dependency, has a strictly smaller critical parameter than the classical model. This is reminiscent of the work of Duminil-Copin, Hil\'ario, Kozma and Sidoravicius on brochette percolation. Our proof differs, however, in that we do not use Aizenman--Grimmett enhancements or differential inequalities. Two key ingredients are the work of Hil\'ario, S\'a, Sanchis and Teixeira on stretched lattices, and the Russo--Seymour--Welsh result for oriented percolation by Duminil-Copin, Tassion and Teixeira.

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