Supercritical self-avoiding walks are space-filling [PDF]
Hugo Duminil-Copin, Gady Kozma, Ariel YadinWe consider random self-avoiding walks between two points on the boundary of a finite subdomain of Z^d (the probability of a self-avoiding trajectory gamma is proportional to mu^{-length(gamma)}). We show that the random trajectory becomes space-filling in the scaling limit when the parameter mu is supercritical.View original: http://arxiv.org/abs/1110.3074
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