covpLT: Coverage Probability of Logit Wald method
In RajeswaranV/proportion: Inference on Single Binomial Proportion and Bayesian Computations
View source: R/201.CoverageProb_BASE_All.R
covpLT R Documentation
Coverage Probability of Logit Wald method
Description
Coverage Probability of Logit Wald method
Usage
covpLT(n, alp, a, b, t1, t2)
Arguments
n
- Number of trials
alp
- Alpha value (significance level required)
a
- Beta parameters for hypo "p"
b
- Beta parameters for hypo "p"
t1
- Lower tolerance limit to check the spread of coverage Probability
t2
- Upper tolerance limit to check the spread of coverage Probability
Details
Evaluation of Wald-type interval based on the logit transformation
of p using coverage probability, root mean square statistic, and the proportion
of proportion lies within the desired level of coverage
Value
A dataframe with
mcpLT
Logit Wald Coverage Probability
micpLT
Logit Wald minimum coverage probability
RMSE_N
Root Mean Square Error from nominal size
RMSE_M
Root Mean Square Error for Coverage Probability
RMSE_MI
Root Mean Square Error for minimum coverage probability
tol
Required tolerance for coverage probability
References
[1] 1993 Vollset SE.
Confidence intervals for a binomial proportion.
Statistics in Medicine: 12; 809 - 824.
[2] 1998 Agresti A and Coull BA.
Approximate is better than "Exact" for interval estimation of binomial proportions.
The American Statistician: 52; 119 - 126.
[3] 1998 Newcombe RG.
Two-sided confidence intervals for the single proportion: Comparison of seven methods.
Statistics in Medicine: 17; 857 - 872.
[4] 2001 Brown LD, Cai TT and DasGupta A.
Interval estimation for a binomial proportion.
Statistical Science: 16; 101 - 133.
[5] 2002 Pan W.
Approximate confidence intervals for one proportion and difference of two proportions
Computational Statistics and Data Analysis 40, 128, 143-157.
[6] 2008 Pires, A.M., Amado, C.
Interval Estimators for a Binomial Proportion: Comparison of Twenty Methods.
REVSTAT - Statistical Journal, 6, 165-197.
[7] 2014 Martin Andres, A. and Alvarez Hernandez, M.
Two-tailed asymptotic inferences for a proportion.
Journal of Applied Statistics, 41, 7, 1516-1529
See Also
Other Basic coverage probability methods:
PlotcovpAS(),
PlotcovpAll(),
PlotcovpBA(),
PlotcovpEX(),
PlotcovpLR(),
PlotcovpLT(),
PlotcovpSC(),
PlotcovpTW(),
PlotcovpWD(),
covpAS(),
covpAll(),
covpBA(),
covpEX(),
covpLR(),
covpSC(),
covpTW(),
covpWD()
Examples
n= 10; alp=0.05; a=1;b=1; t1=0.93;t2=0.97
covpLT(n,alp,a,b,t1,t2)
RajeswaranV/proportion documentation built on June 17, 2022, 9:11 a.m.
R Package Documentation
Browse R Packages
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Note that we can't provide technical support on individual packages. You should contact the package authors for that.
View source: R/201.CoverageProb_BASE_All.R
| covpLT | R Documentation |
Coverage Probability of Logit Wald method
Description
Coverage Probability of Logit Wald method
Usage
covpLT(n, alp, a, b, t1, t2)
Arguments
n |
- Number of trials |
alp |
- Alpha value (significance level required) |
a |
- Beta parameters for hypo "p" |
b |
- Beta parameters for hypo "p" |
t1 |
- Lower tolerance limit to check the spread of coverage Probability |
t2 |
- Upper tolerance limit to check the spread of coverage Probability |
Details
Evaluation of Wald-type interval based on the logit transformation of p using coverage probability, root mean square statistic, and the proportion of proportion lies within the desired level of coverage
Value
A dataframe with
mcpLT |
Logit Wald Coverage Probability |
micpLT |
Logit Wald minimum coverage probability |
RMSE_N |
Root Mean Square Error from nominal size |
RMSE_M |
Root Mean Square Error for Coverage Probability |
RMSE_MI |
Root Mean Square Error for minimum coverage probability |
tol |
Required tolerance for coverage probability |
References
[1] 1993 Vollset SE. Confidence intervals for a binomial proportion. Statistics in Medicine: 12; 809 - 824.
[2] 1998 Agresti A and Coull BA. Approximate is better than "Exact" for interval estimation of binomial proportions. The American Statistician: 52; 119 - 126.
[3] 1998 Newcombe RG. Two-sided confidence intervals for the single proportion: Comparison of seven methods. Statistics in Medicine: 17; 857 - 872.
[4] 2001 Brown LD, Cai TT and DasGupta A. Interval estimation for a binomial proportion. Statistical Science: 16; 101 - 133.
[5] 2002 Pan W. Approximate confidence intervals for one proportion and difference of two proportions Computational Statistics and Data Analysis 40, 128, 143-157.
[6] 2008 Pires, A.M., Amado, C. Interval Estimators for a Binomial Proportion: Comparison of Twenty Methods. REVSTAT - Statistical Journal, 6, 165-197.
[7] 2014 Martin Andres, A. and Alvarez Hernandez, M. Two-tailed asymptotic inferences for a proportion. Journal of Applied Statistics, 41, 7, 1516-1529
See Also
Other Basic coverage probability methods:
PlotcovpAS(),
PlotcovpAll(),
PlotcovpBA(),
PlotcovpEX(),
PlotcovpLR(),
PlotcovpLT(),
PlotcovpSC(),
PlotcovpTW(),
PlotcovpWD(),
covpAS(),
covpAll(),
covpBA(),
covpEX(),
covpLR(),
covpSC(),
covpTW(),
covpWD()
Examples
n= 10; alp=0.05; a=1;b=1; t1=0.93;t2=0.97 covpLT(n,alp,a,b,t1,t2)
R Package Documentation
Browse R Packages
We want your feedback!
Note that we can't provide technical support on individual packages. You should contact the package authors for that.
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