A Charlier–Parseval approach to poisson approximation and its applications

Zacharovas, Vytas; Hwang, Hsien‐Kuei

doi:10.1007/s10986-010-9073-5

Cited by 30 publications

(18 citation statements)

References 81 publications

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“…For the Charlier polynomials, see, for example, Barbour et al (1992;p. 175), Takeuchi (1975), and Zacharovas and Hwang (2010). We put α (m, n, λ)…”

Section: Sum Of Independent Bernoulli Random Variablesmentioning

confidence: 99%

Poisson Approximations for Sum of Bernoulli Random Variables and its Application to Ewens Sampling Formula

Yamato

2017

JJSS

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The Ewens sampling formula is well-known as a distribution of a random partition of the set of integers {1, 2,. .. , n}. We give the condition that the number Kn of distinct components of the formula converges to the shifted Poisson distribution. Based on this convergence, we give the new approximations to the distribution of Kn, which are different from the approximations by Arratia et al. (2000, 2003). The formers are better than the latters. This is shown by comparing the bounds for the total variation distances between the distributions of the approximations and the distribution of Kn. Several examples are given to illustrate the results.

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“…For the Charlier polynomials, see, for example, Barbour et al (1992;p. 175), Takeuchi (1975), and Zacharovas and Hwang (2010). We put α (m, n, λ)…”

Section: Sum Of Independent Bernoulli Random Variablesmentioning

confidence: 99%

Poisson Approximations for Sum of Bernoulli Random Variables and its Application to Ewens Sampling Formula

Yamato

2017

JJSS

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“…Research on the accuracy of approximations is in no way restricted to the four metrics considered in this book, see, for example, [28,167].…”

Section: Bibliographical Notesmentioning

confidence: 99%

Approximation Methods in Probability Theory

Čekanavičius

2016

Universitext

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“…We let Π(θ) denote a Poisson random variable with parameter θ. The following proposition is based on results obtained by Zacharovas and Hwang (2010).…”

Section: On the Distribution Of The Number Of Pointsmentioning

confidence: 99%

Standard and robust intensity parameter estimation for stationary determinantal point processes

Coeurjolly

Biscio

2016

Spatial Statistics

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This work is concerned with the estimation of the intensity parameter of a stationary determinantal point process. We consider the standard estimator, corresponding to the number of observed points per unit volume and a recently introduced median-based estimator more robust to outliers. The consistency and asymptotic normality of estimators are obtained under mild assumptions on the determinantal point process. We illustrate the efficiency of the procedures in a simulation study.

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A Charlier–Parseval approach to poisson approximation and its applications

Cited by 30 publications

References 81 publications

Poisson Approximations for Sum of Bernoulli Random Variables and its Application to Ewens Sampling Formula

Poisson Approximations for Sum of Bernoulli Random Variables and its Application to Ewens Sampling Formula

Approximation Methods in Probability Theory

Standard and robust intensity parameter estimation for stationary determinantal point processes

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