Abstract
Under correlation-type conditions, we derive an upper bound of order $(\log n)/n$ for the average Kolmogorov distance between the distributions of weighted sums of dependent summands and the normal law. The result is based on improved concentration inequalities on high-dimensional Euclidean spheres. Applications are illustrated on the example of log-concave probability measures.
Citation
S. G. Bobkov. G. P. Chistyakov. F. Götze. "Normal approximation for weighted sums under a second-order correlation condition." Ann. Probab. 48 (3) 1202 - 1219, May 2020. https://doi.org/10.1214/19-AOP1388
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