Abstract
In the confetti percolation model, or two-coloured dead leaves model, radius one disks arrive on the plane according to a space-time Poisson process. Each disk is coloured black with probability p and white with probability 1-p. In this paper we show that the critical probability for confetti percolation equals 1/2. That is, if p>1/2 then a.s. there is an unbounded curve in the plane all of whose points are black; while if pi¾?1/2 then a.s. all connected components of the set of black points are bounded. This answers a question of Benjamini and Schramm [1]. The proof builds on earlier work by Hirsch [7] and makes use of an adaptation of a sharp thresholds result of Bourgain. © 2016 Wiley Periodicals, Inc. Random Struct. Alg., 50, 679-697, 2017
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