A quantitative fourth moment theorem in free probability theory
classification
🧮 math.PR
math.OA
keywords
fourthfreemomentdistancequantitativetheoremanaloguechaos
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A quantitative "fourth moment theorem" is provided for any self-adjoint element in a homogeneous Wigner chaos: the Wasserstein distance is controlled by the distance from the fourth moment to two. The proof uses the free counterpart of the Stein discrepancy. On the way, the free analogue of the WSH inequality is established.
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