Computing (Bivariate) Poisson Moments Using Stein–Chen Identities
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Publication:5050790
DOI10.1080/00031305.2020.1763836OpenAlexW3022397155MaRDI QIDQ5050790
Christian H. Weiß, Boris Aleksandrov
Publication date: 18 November 2022
Published in: The American Statistician (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00031305.2020.1763836
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Cites Work
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- Fundamentals of Stein's method
- Stein's method for comparison of univariate distributions
- On Stein's identity and its applications
- Calculation of density for the multivariate Poisson distribution
- Estimation of the mean of a multivariate normal distribution
- Poisson approximation for dependent trials
- On characterization and goodness-of-fit test of some discrete distribution families
- Siegel's formula via Stein's identities
- Compound Poisson INAR(1) processes: stochastic properties and testing for overdispersion
- Connections of the Poisson weight function to overdispersion and underdispersion
- On a Characterization of Poisson Distribution Through Inequalities of Chernoff-Type
- Moment identity for discrete random variable and its applications
- Strategies for Efficient Computation of Multivariate Poisson Probabilities
- Modelling counts with state-dependent zero inflation
- CHARACTERIZATION OF CERTAIN DISCRETE DISTRIBUTIONS BY DIFFERENTIAL EQUATIONS WITH RESPECT TO THEIR PARAMETERS1
- A MULTIVARIATE VERSION OF STEIN'S IDENTITY WITH APPLICATIONS TO MOMENT CALCULATIONS AND ESTIMATION OF CONDITIONALLY SPECIFIED DISTRIBUTIONS
- An Introduction to Discrete‐Valued Time Series
- Approximation of the difference of two Poisson-like counts by Skellam
- Estimation of the Marginal Expected Shortfall: the Mean When a Related Variable is Extreme
- The Tail Stein's Identity with Applications to Risk Measures
- Negative Moments of Positive Random Variables
- The Determination of Partial Moments
- Univariate Discrete Distributions
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