CoefQuartVarCI: R6 Confidence Intervals for the Coefficient of Quartile...
In cvcqv: Coefficient of Variation (CV) with Confidence Intervals (CI)
Description
Arguments
Details
Value
References
Examples
Description
The R6 class CoefQuartVarCI for the confidence intervals
of coefficient of quartile variation (cqv)
Arguments
x
An R object. Currently there are methods for numeric vectors
na.rm
a logical value indicating whether NA values should be
stripped before the computation proceeds.
digits
integer indicating the number of decimal places to be used.
methods
the available computation methods of confidence intervals are:
"bonett_ci", "norm_ci", "basic_ci", "perc_ci", "bca_ci" or "all_ci".
R
integer indicating the number of bootstrap replicates.
Details
- Coefficient of Quartile Variation
The
cqv is a measure of relative dispersion that is based on
interquartile range (iqr). Since cqv is unitless, it is useful
for comparison of variables with different units. It is also a measure of
homogeneity [1, 2].
Value
An object of type "list" which contains the estimate, the intervals,
and the computation method. It has two components:
- $method
A description of statistical method used
for the computations.
- $statistics
A data frame representing three
vectors: est, lower and upper limits of 95% confidence interval
(CI):
est: cqv*100
Bonett
95% CI: It uses a centering adjustment which helps to equalize the tail
error probabilities [1, 2].
Normal approximation
95% CI: The intervals calculated by the normal approximation [3,
4], using boot.ci.
Basic bootstrap 95%
CI: The intervals calculated by the basic bootstrap method [3, 4],
using boot.ci.
Bootstrap percentile 95%
CI: The intervals calculated by the bootstrap percentile method [3,
4], using boot.ci.
Adjusted bootstrap
percentile (BCa) 95% CI: The intervals calculated by the adjusted
bootstrap percentile (BCa) method [3, 4], using
boot.ci.
References
[1] Bonett, DG., 2006, Confidence interval for a
coefficient of quartile variation, Computational Statistics & Data
Analysis, 50(11), 2953-7, DOI:
http://doi.org/10.1016/j.csda.2005.05.007
[2] Altunkaynak, B., Gamgam, H., 2018, Bootstrap
confidence intervals for the coefficient of quartile variation, Simulation
and Computation, 1-9, DOI:
http://doi.org/10.1080/03610918.2018.1435800
[3] Canty, A., & Ripley, B, 2017, boot: Bootstrap R
(S-Plus) Functions. R package version 1.3-20.
[4] Davison, AC., & Hinkley, DV., 1997, Bootstrap Methods
and Their Applications. Cambridge University Press, Cambridge. ISBN
0-521-57391-2
Examples
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y <- c(
0.2, 0.5, 1.1, 1.4, 1.8, 2.3, 2.5, 2.7, 3.5, 4.4,
4.6, 5.4, 5.4, 5.7, 5.8, 5.9, 6.0, 6.6, 7.1, 7.9
)
CoefQuartVarCI$new(x = y)$bonett_ci()
cqv_y <- CoefQuartVarCI$new(
x = y,
alpha = 0.05,
R = 1000,
digits = 2
)
cqv_y$bonett_ci()
R6::is.R6(cqv_y)
cvcqv documentation built on Aug. 6, 2019, 5:10 p.m.
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Description Arguments Details Value References Examples
Description
The R6 class CoefQuartVarCI for the confidence intervals
of coefficient of quartile variation (cqv)
Arguments
x |
An |
na.rm |
a logical value indicating whether |
digits |
integer indicating the number of decimal places to be used. |
methods |
the available computation methods of confidence intervals are: "bonett_ci", "norm_ci", "basic_ci", "perc_ci", "bca_ci" or "all_ci". |
R |
integer indicating the number of bootstrap replicates. |
Details
- Coefficient of Quartile Variation
The cqv is a measure of relative dispersion that is based on interquartile range (iqr). Since cqv is unitless, it is useful for comparison of variables with different units. It is also a measure of homogeneity
[1, 2].
Value
An object of type "list" which contains the estimate, the intervals, and the computation method. It has two components:
- $method
A description of statistical method used for the computations.
- $statistics
A data frame representing three vectors: est, lower and upper limits of 95% confidence interval
(CI):
est:cqv*100
Bonett 95% CI: It uses a centering adjustment which helps to equalize the tail error probabilities[1, 2].
Normal approximation 95% CI: The intervals calculated by the normal approximation[3, 4], using boot.ci.
Basic bootstrap 95% CI: The intervals calculated by the basic bootstrap method[3, 4], using boot.ci.
Bootstrap percentile 95% CI: The intervals calculated by the bootstrap percentile method[3, 4], using boot.ci.
Adjusted bootstrap percentile (BCa) 95% CI: The intervals calculated by the adjusted bootstrap percentile (BCa) method[3, 4], using boot.ci.
References
[1] Bonett, DG., 2006, Confidence interval for a
coefficient of quartile variation, Computational Statistics & Data
Analysis, 50(11), 2953-7, DOI:
http://doi.org/10.1016/j.csda.2005.05.007
[2] Altunkaynak, B., Gamgam, H., 2018, Bootstrap
confidence intervals for the coefficient of quartile variation, Simulation
and Computation, 1-9, DOI:
http://doi.org/10.1080/03610918.2018.1435800
[3] Canty, A., & Ripley, B, 2017, boot: Bootstrap R
(S-Plus) Functions. R package version 1.3-20.
[4] Davison, AC., & Hinkley, DV., 1997, Bootstrap Methods
and Their Applications. Cambridge University Press, Cambridge. ISBN
0-521-57391-2
Examples
1 2 3 4 5 6 7 8 9 10 11 12 13 | y <- c(
0.2, 0.5, 1.1, 1.4, 1.8, 2.3, 2.5, 2.7, 3.5, 4.4,
4.6, 5.4, 5.4, 5.7, 5.8, 5.9, 6.0, 6.6, 7.1, 7.9
)
CoefQuartVarCI$new(x = y)$bonett_ci()
cqv_y <- CoefQuartVarCI$new(
x = y,
alpha = 0.05,
R = 1000,
digits = 2
)
cqv_y$bonett_ci()
R6::is.R6(cqv_y)
|
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