fixedHajnal.onet_n: Fixed-design one-sample t-tests using Hajnal's ratio and a...
In NAP: Non-Local Alternative Priors in Psychology
Description
Usage
Arguments
Value
Author(s)
References
Examples
Description
In two-sided fixed design one-sample t-tests with composite alternative prior assumed on the standardized effect size μ/σ under the alternative and a prefixed sample size, this function calculates the expected log(Hajnal's ratio) at a varied range of standardized effect sizes.
Usage
1
2
3
fixedHajnal.onet_n(es1 = 0.3, es = c(0, 0.2, 0.3, 0.5),
n.fixed = 20,
nReplicate = 50000, nCore)
Arguments
es1
Positive numeric. Default: 0.3. For this, the composite alternative prior on the standardized effect size μ/σ takes values 0.3 and -0.3 each with equal probability 1/2.
es
Numeric vector. Standardized effect sizes μ/σ where the expected weights of evidence is desired. Default: c(0, 0.2, 0.3, 0.5).
n.fixed
Positive integer. Prefixed sample size. Default: 20.
nReplicate
Positve integer. Number of replicated studies based on which the expected weights of evidence is calculated. Default: 50,000.
nCore
Positive integer. Default: One less than the total number of available cores.
Value
A list with two components named summary and BF.
$summary is a data frame with columns effect.size containing the values in es and avg.logBF containing the expected log(Hajnal's ratios) at those values.
$BF is a matrix of dimension length(es) by nReplicate. Each row contains the Hajnal's ratios at the corresponding standardized effec size in nReplicate replicated studies.
Author(s)
Sandipan Pramanik and Valen E. Johnson
References
Hajnal, J. (1961). A two-sample sequential t-test.Biometrika, 48:65-75,
[Article].
Schnuerch, M. and Erdfelder, E. (2020). A two-sample sequential t-test.Biometrika, 48:65-75, [Article].
Examples
1
out = fixedHajnal.onet_n(n.fixed = 20, es = c(0, 0.3), nCore = 1)
NAP documentation built on Jan. 6, 2022, 5:07 p.m.
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Description Usage Arguments Value Author(s) References Examples
Description
In two-sided fixed design one-sample t-tests with composite alternative prior assumed on the standardized effect size μ/σ under the alternative and a prefixed sample size, this function calculates the expected log(Hajnal's ratio) at a varied range of standardized effect sizes.
Usage
1 2 3 | fixedHajnal.onet_n(es1 = 0.3, es = c(0, 0.2, 0.3, 0.5),
n.fixed = 20,
nReplicate = 50000, nCore)
|
Arguments
es1 |
Positive numeric. Default: 0.3. For this, the composite alternative prior on the standardized effect size μ/σ takes values 0.3 and -0.3 each with equal probability 1/2. |
es |
Numeric vector. Standardized effect sizes μ/σ where the expected weights of evidence is desired. Default: |
n.fixed |
Positive integer. Prefixed sample size. Default: 20. |
nReplicate |
Positve integer. Number of replicated studies based on which the expected weights of evidence is calculated. Default: 50,000. |
nCore |
Positive integer. Default: One less than the total number of available cores. |
Value
A list with two components named summary and BF.
$summary is a data frame with columns effect.size containing the values in es and avg.logBF containing the expected log(Hajnal's ratios) at those values.
$BF is a matrix of dimension length(es) by nReplicate. Each row contains the Hajnal's ratios at the corresponding standardized effec size in nReplicate replicated studies.
Author(s)
Sandipan Pramanik and Valen E. Johnson
References
Hajnal, J. (1961). A two-sample sequential t-test.Biometrika, 48:65-75, [Article].
Schnuerch, M. and Erdfelder, E. (2020). A two-sample sequential t-test.Biometrika, 48:65-75, [Article].
Examples
1 | out = fixedHajnal.onet_n(n.fixed = 20, es = c(0, 0.3), nCore = 1)
|
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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