Stein's Method for Probability Distributions on $\mathbb{S}^1$
Abstract: In this paper, we propose a modification to the density approach to Stein's method for intervals for the unit circle $\mathbb{S}1$ which is motivated by the differing geometry of $\mathbb{S}1$ to Euclidean space. We provide an upper bound to the Wasserstein metric for circular distributions and exhibit a variety of different bounds between distributions; particularly, between the von-Mises and wrapped normal distributions, and the wrapped normal and wrapped Cauchy distributions.
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