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Paper detail

Stein's method via induction

Applying an inductive technique for Stein and zero bias couplings yields Berry-Esseen theorems for normal approximation for two new examples. The conditions of the main results do not require that the couplings be bounded. Our two applications, one to the Erdős-Rényi, random graph with a fixed number of edges, and one to Jack measure on tableaux, demonstrate that the method can handle non-bounded variables with non-trivial global dependence, and can produce bounds in the Kolmogorov metric with the optimal rate.

preprint2020arXivOpen access
Louis H. Y. ChenLarry GoldsteinAdrian Röllin
math.COmath.PR
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Louis H. Y. ChenLarry GoldsteinAdrian Röllin

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