A Poisson distribution is well used as a standard model for analyzing count data. Most of the usual constructing confi-dence intervals are based on an asymptotic approximation to the distribution of the sample mean by using the Wald in-terval. That is, the Wald interval has poor performance in terms of coverage probabilities and average widths interval for small means and small to moderate sample sizes. In this paper, an approximate confidence interval for a Poisson mean is proposed and is based on an empirically determined the tail probabilities. Simulation results show that the pro-posed interval outperforms the others when small means and small to moderate sample sizes
The estimation of the parameter of the Poisson distribution, say λ, is an important task in applied ...
Results of numerical procedure of constructing confidence intervals for parameter of the Poisson dis...
We address the classic problem of interval estimation of a binomial proportion. The Wald interval p^...
The Poisson distribution is applied as an appropriate standard model to analyze count data. Because ...
Includes bibliographical references (pages 60-61)Confidence intervals are a very useful tool for mak...
This paper proposes four new confidence intervals for the coefficient of variation of a Poisson dist...
Methods to find a confidence interval for Poisson distributed variables are illuminated, especially ...
The authors propose a new method for constructing a confidence interval for the expectation # of a ...
The standard method of obtaining a two-sided confidence interval for the Poisson mean produces an in...
Directly standardized mortality rates are examples of weighted sums of Poisson rate parameters. If t...
This paper studies the interval estimation of three discrete distributions: thebinomial distribution...
All in-text references underlined in blue are linked to publications on ResearchGate, letting you ac...
In this note we consider coverage of confidence intervals calculated with and without systematic unc...
<p>Confidence intervals using asymptotic properties of maximum likelihood estimates - Poisson distri...
The binomial and Poisson distributions are basis to many aspects of statistical data analysis. This ...
The estimation of the parameter of the Poisson distribution, say λ, is an important task in applied ...
Results of numerical procedure of constructing confidence intervals for parameter of the Poisson dis...
We address the classic problem of interval estimation of a binomial proportion. The Wald interval p^...
The Poisson distribution is applied as an appropriate standard model to analyze count data. Because ...
Includes bibliographical references (pages 60-61)Confidence intervals are a very useful tool for mak...
This paper proposes four new confidence intervals for the coefficient of variation of a Poisson dist...
Methods to find a confidence interval for Poisson distributed variables are illuminated, especially ...
The authors propose a new method for constructing a confidence interval for the expectation # of a ...
The standard method of obtaining a two-sided confidence interval for the Poisson mean produces an in...
Directly standardized mortality rates are examples of weighted sums of Poisson rate parameters. If t...
This paper studies the interval estimation of three discrete distributions: thebinomial distribution...
All in-text references underlined in blue are linked to publications on ResearchGate, letting you ac...
In this note we consider coverage of confidence intervals calculated with and without systematic unc...
<p>Confidence intervals using asymptotic properties of maximum likelihood estimates - Poisson distri...
The binomial and Poisson distributions are basis to many aspects of statistical data analysis. This ...
The estimation of the parameter of the Poisson distribution, say λ, is an important task in applied ...
Results of numerical procedure of constructing confidence intervals for parameter of the Poisson dis...
We address the classic problem of interval estimation of a binomial proportion. The Wald interval p^...