Conformal Invariance and SLE in Two-Dimensional Ising Spin Glasses
Abstract
We present numerical evidence that the techniques of conformal field theory might be applicable to two-dimensional Ising spin glasses with Gaussian bond distributions. It is shown that certain domain wall distributions in one geometry can be related to that in a second geometry by a conformal transformation. We also present direct evidence that the domain walls are stochastic Loewner (SLE) processes with ≈ 2.1. An argument is given that their fractal dimension df is related to their interface energy exponent θ by df-1=3/[4(3+θ)], which is consistent with the commonly quoted values df ≈ 1.27 and θ ≈ -0.28.
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