In this paper we develop some new confidence intervals for the binomial proportion. The Clopper-Pearson interval is interpreted as an outcome of randomised confidence interval theory. The problem of randomised intervals possibly being empty is solved using a new technique involving 'tail functions, with the offshoot being a new class of randomised and Clopper-Pearson intervals. Some of the new intervals are investigated and shown to have attractive frequentist properties. Coverage probabilities and expected widths are compared and guidelines are established for constructing the optimal generalised Clopper-Pearson interval in any given situation
Four interval estimation methods for the ratio of marginal binomial proportions are compared in term...
The Wilson score confidence interval for a binomial proportion has been widely applied in practice, ...
The construction of asymptotic confidence intervals is considered for the difference of binomial pro...
Well-recommended methods of forming ‘confidence intervals’ for a binomial proportion give interval e...
Wardell (1997) provided a method for constructing confidence intervals on a proportion that modifies...
This paper discusses the classic but still current problem of interval estimation of a binomial prop...
The construction of a confidence interval for a binomial parameter is a basic analysis in statistica...
We revisit the problem of interval estimation of a binomial proportion. The erratic behavior of the ...
We address the classic problem of interval estimation of a binomial proportion. The Wald interval p^...
<p>The well-known Wilson and Agresti–Coull confidence intervals for a binomial proportion <i>p</i> a...
We address the classic problem of interval estimation of a binomial proportion. The Wald interval p...
The subject of this thesis is the point estimate and interval estimates of the binomial proportion. ...
The present work follows up the ROBUST 2006 paper where various types of confidence intervals for bi...
The Bachelor thesis deals with the construction of confidence intervals for the parameter of the Bin...
This paper takes Brenner & Quan (The Statistician, 39, pp. 391-397) to task for their claim that a B...
Four interval estimation methods for the ratio of marginal binomial proportions are compared in term...
The Wilson score confidence interval for a binomial proportion has been widely applied in practice, ...
The construction of asymptotic confidence intervals is considered for the difference of binomial pro...
Well-recommended methods of forming ‘confidence intervals’ for a binomial proportion give interval e...
Wardell (1997) provided a method for constructing confidence intervals on a proportion that modifies...
This paper discusses the classic but still current problem of interval estimation of a binomial prop...
The construction of a confidence interval for a binomial parameter is a basic analysis in statistica...
We revisit the problem of interval estimation of a binomial proportion. The erratic behavior of the ...
We address the classic problem of interval estimation of a binomial proportion. The Wald interval p^...
<p>The well-known Wilson and Agresti–Coull confidence intervals for a binomial proportion <i>p</i> a...
We address the classic problem of interval estimation of a binomial proportion. The Wald interval p...
The subject of this thesis is the point estimate and interval estimates of the binomial proportion. ...
The present work follows up the ROBUST 2006 paper where various types of confidence intervals for bi...
The Bachelor thesis deals with the construction of confidence intervals for the parameter of the Bin...
This paper takes Brenner & Quan (The Statistician, 39, pp. 391-397) to task for their claim that a B...
Four interval estimation methods for the ratio of marginal binomial proportions are compared in term...
The Wilson score confidence interval for a binomial proportion has been widely applied in practice, ...
The construction of asymptotic confidence intervals is considered for the difference of binomial pro...