Stein’s method for comparison of univariate distributions

Variance-Gamma approximation via Stein’s method

Variance-Gamma distributions are widely used in financial modelling and contain as special cases the normal, Gamma and Laplace distributions. In this paper we extend Stein’s method to this class of distributions. In particular, we obtain a Stein equation and smoothness estimates for its solution. This Stein equation has the attractive property of reducing to the known normal and Gamma Stein equ...

Distances between probability distributions via characteristic functions and biasing

In a spirit close to classical Stein’s method, we introduce a new technique to derive first order ODEs on differences of characteristic functions. Then, using concentration inequalities and Fourier transform tools, we convert this information into sharp bounds for the so-called smooth Wasserstein metrics which frequently arise in Stein’s method theory. Our methodolgy is particularly efficient w...

Stein’s method and birth-death processes

Barbour (1988) introduced a probabilistic view of Stein’s method for estimating the error in probability approximations. However, in the case of approximations by general distributions on the integers, there have been no purely probabilistic proofs of Stein bounds till this paper. Furthermore, the methods introduced here apply to a very large class of approximating distributions on the non-nega...

Stein’s Method for Chisquare Approximations, Weak Law of Large Numbers, and Discrete Distributions from a Gibbs View Point

Fundamentals of Stein ’ s method ∗

Abstract: This survey article discusses the main concepts and techniques of Stein’s method for distributional approximation by the normal, Poisson, exponential, and geometric distributions, and also its relation to concentration of measure inequalities. The material is presented at a level accessible to beginning graduate students studying probability with the main emphasis on the themes that a...