Dynamics of Lattice Triangulations on Thin Rectangles
Abstract
We consider random lattice triangulations of n× k rectangular regions with weight λ|σ| where λ>0 is a parameter and |σ| denotes the total edge length of the triangulation. When λ∈(0,1) and k is fixed, we prove a tight upper bound of order n2 for the mixing time of the edge-flip Glauber dynamics. Combined with the previously known lower bound of order ((n2)) for λ>1 [3], this establishes the existence of a dynamical phase transition for thin rectangles with critical point at λ=1.
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