Logarithmic delocalization of low temperature 3D Ising and Potts interfaces above a hard floor

Joseph Chen, Reza Gheissari, Eyal Lubetzky
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Abstract

We study the entropic repulsion of the low temperature 3D Ising and Potts interface in an $n\times n \times n$ box with blue boundary conditions on its bottom face (the hard floor), and red boundary conditions on its other five faces. For Ising, Frohlich and Pfister proved in 1987 that the typical interface height above the origin diverges (non-quantitatively), via correlation inequalities special to the Ising model; no such result was known for Potts. We show for both the Ising and Potts models that the entropic repulsion fully overcomes the potentially attractive interaction with the floor, and obtain a logarithmically diverging lower bound on the typical interface height. This is complemented by a conjecturally sharp upper bound of $\lfloor \xi^{-1}\log n\rfloor$ where $\xi$ is the rate function for a point-to-plane non-red connection under the infinite volume red measure. The proof goes through a coupled random-cluster interface to overcome the potential attractive interaction with the boundary, and a coupled fuzzy Potts model to reduce the upper bound to a simpler setting where the repulsion is attained by conditioning a no-floor interface to lie in the upper half-space.
硬地板上方低温三维伊辛和波茨界面的对数去焦化
我们研究了在一个 $n\times n \times n$ 的盒子中低温三维伊辛和波特斯界面的熵斥力,盒子底面(硬地板)为蓝色边界条件,其他五个面为红色边界条件。对于伊辛模型,弗洛里希和普菲斯特在 1987 年证明了原点之上的典型面高度发散(非定量),即伊辛模型所特有的相关不等式;而对于波茨模型,还不知道有这样的结果。我们证明了伊辛模型和波茨模型的熵斥力完全克服了与底面的潜在吸引力相互作用,并得到了典型界面高度的对数发散下限。这又得到了一个猜想中的尖锐上界:$lfloor \xi^{-1}\log n\rfloor$ ,其中$\xi$ 是无限体积红色度量下点到平面非红色连接的速率函数。该证明通过一个耦合随机-簇界面来克服与边界的潜在吸引力相互作用,并通过一个耦合模糊波特斯模型将上界还原为一个更简单的设置,即通过将无地板界面设置为位于上半空间来实现斥力。
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