Abstract
We introduce some applications of Stein's method in the high temperature analysis of spin glasses. Stein's method allows the direct analysis of the Gibbs measure without having to create a cavity. Another advantage is that it gives limit theorems with total variation error bounds, although the bounds can be suboptimal. A surprising byproduct of our analysis is a relatively transparent explanation of the Thouless-Anderson-Palmer system of equations. Along the way, we develop Stein's method for mixtures of two Gaussian densities. © 2009 The Author(s).
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Chatterjee, S. (2010). Spin glasses and Stein’s method. Probability Theory and Related Fields, 148(3–4), 567–600. https://doi.org/10.1007/s00440-009-0240-8
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