The Wulff crystal of self-dual FK-percolation becomes round when approaching criticality

Abstract

The study of the phase transition in planar FK-percolation on the square lattice has seen significant recent breakthroughs. The model undergoes a change in the nature of its phase transition at q = 4, transitioning from a continuous to a discontinuous regime. The aim of this article is to investigate the behaviour of the model in the discontinuous regime as q > 4 approaches the continuous transition point 4 from above, while maintaining the critical parameter p = pc(q). We prove that in this limit, the correlation length becomes isotropic. The core of the proof builds upon the recently established rotational invariance of the large-scale features of the model at q = 4 (arXiv:2012.11672).

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