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Berry-Esseen bounds in the inhomogeneous Curie-Weiss model with external field

We study the inhomogeneous Curie-Weiss model with external field, where the inhomogeneity is introduced by adding a positive weight to every vertex and letting the interaction strength between two vertices be proportional to the product of their weights. In this model, the sum of the spins obeys a central limit theorem outside the critical line. We derive a Berry-Esseen rate of convergence for this limit theorem using Stein's method for exchangeable pairs. For this, we, amongst others, need to generalize this method to a multidimensional setting with unbounded random variables.

preprint2019arXivOpen access
Sander DommersPeter Eichelsbacher
math.PR
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Open access2 authors1 topic
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Sander DommersPeter Eichelsbacher

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