The understanding of site percolation on the triangular lattice progressed greatly in the last decade. Smirnov proved conformal invariance of critical percolation, thus paving the way for the construction of its scaling limit. Recently, the scaling limit of near critical percolation was also constructed by Garban, Pete and Schramm. The aim of this article is to explain how these results imply the convergence, as $p$ tends to $p_c$, of the Wulff crystal to a Euclidean disk. The main ingredient of the proof is the rotational invariance of the scaling limit of near-critical percolation proved by these three mathematicians.
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机译:在过去十年中,对三角形晶格上的位点渗漏的理解有了很大的进步。 Smirnov证明了临界渗流的共形不变性,从而为其标度极限的构建铺平了道路。最近,Garban,Pete和Schramm也构造了接近临界渗滤的比例极限。本文的目的是解释当$ p $趋于$ p_c $时,这些结果如何暗示Wulff晶体收敛到欧几里得圆盘。证明的主要成分是这三位数学家证明的近临界渗流的比例极限的旋转不变性。
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