Returns the final confidence interval for the parameter of interest. It is based on the prototype case, i.e., the test for testing a mean for normally distributed variables.
getFinalConfidenceInterval(
design,
dataInput,
...,
directionUpper = TRUE,
thetaH0 = NA_real_,
tolerance = 1e-06,
stage = NA_integer_
)The trial design.
The summary data used for calculating the test results.
This is either an element of DatasetMeans, of DatasetRates, or of DatasetSurvival
and should be created with the function getDataset.
For more information see getDataset.
Further (optional) arguments to be passed:
normalApproximationThe type of computation of the p-values. Default is FALSE for
testing means (i.e., the t test is used) and TRUE for testing rates and the hazard ratio.
For testing rates, if
normalApproximation = FALSE is specified, the binomial test
(one sample) or the exact test of Fisher (two samples) is used for calculating the p-values.
In the survival setting,
normalApproximation = FALSE has no effect.
equalVariancesThe type of t test. For testing means in two treatment groups, either
the t test assuming that the variances are equal or the t test without assuming this,
i.e., the test of Welch-Satterthwaite is calculated, default is TRUE.
Specifies the direction of the alternative,
only applicable for one-sided testing; default is TRUE
which means that larger values of the test statistics yield smaller p-values.
The null hypothesis value,
default is 0 for the normal and the binary case (testing means and rates, respectively),
it is 1 for the survival case (testing the hazard ratio).
For non-inferiority designs, thetaH0 is the non-inferiority bound.
That is, in case of (one-sided) testing of
means: a value != 0
(or a value != 1 for testing the mean ratio) can be specified.
rates: a value != 0
(or a value != 1 for testing the risk ratio pi1 / pi2) can be specified.
survival data: a bound for testing H0: hazard ratio = thetaH0 != 1 can be specified.
For testing a rate in one sample, a value thetaH0 in (0, 1) has to be specified for
defining the null hypothesis H0: pi = thetaH0.
The numerical tolerance, default is 1e-06.
The stage number (optional). Default: total number of existing stages in the data input.
Returns a list containing
finalStage,
medianUnbiased,
finalConfidenceInterval,
medianUnbiasedGeneral, and
finalConfidenceIntervalGeneral.
Depending on design and dataInput the final confidence interval and median unbiased estimate
that is based on the stagewise ordering of the sample space will be calculated and returned.
Additionally, a non-standardized ("general") version is provided,
the estimated standard deviation must be used to obtain
the confidence interval for the parameter of interest.
For the inverse normal combination test design with more than two stages, a warning informs that the validity of the confidence interval is theoretically shown only if no sample size change was performed.
Other analysis functions:
getAnalysisResults(),
getClosedCombinationTestResults(),
getClosedConditionalDunnettTestResults(),
getConditionalPower(),
getConditionalRejectionProbabilities(),
getFinalPValue(),
getRepeatedConfidenceIntervals(),
getRepeatedPValues(),
getStageResults(),
getTestActions()
# NOT RUN {
design <- getDesignInverseNormal(kMax = 2)
data <- getDataset(
n = c(20, 30),
means = c(50, 51),
stDevs = c(130, 140)
)
getFinalConfidenceInterval(design, dataInput = data)
# }
# NOT RUN {
# }
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