HotellingsT: Hotelling's T2 Test
In ICSNP: Tools for Multivariate Nonparametrics
HotellingsT2 R Documentation
Hotelling's T2 Test
Description
Hotelling's T2 test for the one and two sample case.
Usage
HotellingsT2(X, ...)
## Default S3 method:
HotellingsT2(X, Y = NULL, mu = NULL, test = "f",
na.action = na.fail, ...)
## S3 method for class 'formula'
HotellingsT2(formula, na.action = na.fail, ...)
Arguments
X
a numeric data frame or matrix.
Y
an optional numeric data frame or matrix for the two sample test. If NULL a one sample test is performed.
mu
a vector indicating the hypothesized value of the mean (or difference
in means if a two sample test is performed). NULL represents origin or no difference between the groups.
test
if 'f', the decision is based on the F-distribution, if 'chi' a chi-squared approximation is used.
formula
a formula of the form X ~ g where X
is a numeric matrix giving the data values and g a factor
with two levels giving the corresponding groups.
na.action
a function which indicates what should happen when the data
contain 'NA's. Default is to fail.
...
further arguments to be passed to or from methods.
Details
The classical test for testing the location of a multivariate population or for testing the mean
difference for two multivariate populations. When test = "f" the F-distribution is used for
the test statistic and it is assumed that the data are normally distributed. If the chisquare
approximation is used, the normal assumption can be relaxed to existence of second moments.
In the two sample case both populations are assumed to have the same covariance matrix.
The formula interface is only applicable for the 2-sample tests.
Value
A list with class 'htest' containing the following components:
statistic
the value of the T2-statistic. (That is the scaled value of the statistic that has an
F distribution or a chisquare distribution depending on the value of test).
parameter
the degrees of freedom for the T2-statistic.
p.value
the p-value for the test.
null.value
the specified hypothesized value of the mean or mean difference
depending on whether it was a one-sample test or a two-sample test.
alternative
a character string with the value 'two.sided'.
method
a character string indicating what type of test was performed.
data.name
a character string giving the name of the data (and grouping vector).
Author(s)
Klaus Nordhausen
References
Anderson, T.W. (2003), An introduction to
multivariate analysis, New Jersey: Wiley.
Examples
# one sample test:
data(pulmonary)
HotellingsT2(pulmonary)
HotellingsT2(pulmonary, mu = c(0,0,2), test = "chi")
# two sample test:
set.seed(123456)
X <- rmvnorm(20, c(0, 0, 0, 0), diag(1:4))
Y <- rmvnorm(30, c(0.5, 0.5, 0.5, 0.5), diag(1:4))
Z <- rbind(X, Y)
g <- factor(rep(c(1,2),c(20,30)))
HotellingsT2(X, Y)
HotellingsT2(Z ~ g, mu = rep(-0.5,4))
rm(.Random.seed)
ICSNP documentation built on Sept. 18, 2023, 5:16 p.m.
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| HotellingsT2 | R Documentation |
Hotelling's T2 Test
Description
Hotelling's T2 test for the one and two sample case.
Usage
HotellingsT2(X, ...)
## Default S3 method:
HotellingsT2(X, Y = NULL, mu = NULL, test = "f",
na.action = na.fail, ...)
## S3 method for class 'formula'
HotellingsT2(formula, na.action = na.fail, ...) Arguments
X |
a numeric data frame or matrix. |
Y |
an optional numeric data frame or matrix for the two sample test. If NULL a one sample test is performed. |
mu |
a vector indicating the hypothesized value of the mean (or difference in means if a two sample test is performed). NULL represents origin or no difference between the groups. |
test |
if 'f', the decision is based on the F-distribution, if 'chi' a chi-squared approximation is used. |
formula |
a formula of the form |
na.action |
a function which indicates what should happen when the data contain 'NA's. Default is to fail. |
... |
further arguments to be passed to or from methods. |
Details
The classical test for testing the location of a multivariate population or for testing the mean
difference for two multivariate populations. When test = "f" the F-distribution is used for
the test statistic and it is assumed that the data are normally distributed. If the chisquare
approximation is used, the normal assumption can be relaxed to existence of second moments.
In the two sample case both populations are assumed to have the same covariance matrix.
The formula interface is only applicable for the 2-sample tests.
Value
A list with class 'htest' containing the following components:
statistic |
the value of the T2-statistic. (That is the scaled value of the statistic that has an
F distribution or a chisquare distribution depending on the value of |
parameter |
the degrees of freedom for the T2-statistic. |
p.value |
the p-value for the test. |
null.value |
the specified hypothesized value of the mean or mean difference depending on whether it was a one-sample test or a two-sample test. |
alternative |
a character string with the value 'two.sided'. |
method |
a character string indicating what type of test was performed. |
data.name |
a character string giving the name of the data (and grouping vector). |
Author(s)
Klaus Nordhausen
References
Anderson, T.W. (2003), An introduction to multivariate analysis, New Jersey: Wiley.
Examples
# one sample test:
data(pulmonary)
HotellingsT2(pulmonary)
HotellingsT2(pulmonary, mu = c(0,0,2), test = "chi")
# two sample test:
set.seed(123456)
X <- rmvnorm(20, c(0, 0, 0, 0), diag(1:4))
Y <- rmvnorm(30, c(0.5, 0.5, 0.5, 0.5), diag(1:4))
Z <- rbind(X, Y)
g <- factor(rep(c(1,2),c(20,30)))
HotellingsT2(X, Y)
HotellingsT2(Z ~ g, mu = rep(-0.5,4))
rm(.Random.seed) R Package Documentation
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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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