approx.hotelling.diff.test: Approximate Hotelling T^2-Test for One or Two Population...
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approx.hotelling.diff.test R Documentation
Approximate Hotelling T^2-Test for One or Two Population Means
Description
A multivariate hypothesis test for a single population mean or a
difference between them. This version attempts to adjust for
multivariate autocorrelation in the samples.
Usage
approx.hotelling.diff.test(
x,
y = NULL,
mu0 = 0,
assume.indep = FALSE,
var.equal = FALSE,
...
)
Arguments
x
a numeric matrix of data values with cases in rows and
variables in columns.
y
an optinal matrix of data values with cases in rows and
variables in columns for a 2-sample test.
mu0
an optional numeric vector: for a 1-sample test, the
poulation mean under the null hypothesis; and for a 2-sample
test, the difference between population means under the null
hypothesis; defaults to a vector of 0s.
assume.indep
if TRUE, performs an ordinary Hotelling's
test without attempting to account for autocorrelation.
var.equal
for a 2-sample test, perform the pooled test:
assume population variance-covariance matrices of the two
variables are equal.
...
additional arguments, passed on to spectrum0.mvar(),
etc.; in particular, order.max= can be used to limit the order
of the AR model used to estimate the effective sample size.
Value
An object of class htest with the following information:
statistic
The T^2 statistic.
parameter
Degrees of freedom.
p.value
P-value.
method
Method specifics.
null.value
Null hypothesis mean or mean difference.
alternative
Always "two.sided".
estimate
Sample difference.
covariance
Estimated variance-covariance matrix of the estimate of the difference.
covariance.x
Estimated variance-covariance matrix of the estimate of the mean of x.
covariance.y
Estimated variance-covariance matrix of the estimate of the mean of y.
It has a print method print.htest().
Note
For mcmc.list input, the variance for this test is
estimated with unpooled means. This is not strictly correct.
References
Hotelling, H. (1947). Multivariate Quality Control. In C. Eisenhart, M. W.
Hastay, and W. A. Wallis, eds. Techniques of Statistical Analysis. New York:
McGraw-Hill.
See Also
t.test()
statnet/ergm documentation built on April 17, 2024, 12:21 p.m.
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View source: R/approx.hotelling.diff.test.R
| approx.hotelling.diff.test | R Documentation |
Approximate Hotelling T^2-Test for One or Two Population Means
Description
A multivariate hypothesis test for a single population mean or a difference between them. This version attempts to adjust for multivariate autocorrelation in the samples.
Usage
approx.hotelling.diff.test(
x,
y = NULL,
mu0 = 0,
assume.indep = FALSE,
var.equal = FALSE,
...
)
Arguments
x |
a numeric matrix of data values with cases in rows and variables in columns. |
y |
an optinal matrix of data values with cases in rows and variables in columns for a 2-sample test. |
mu0 |
an optional numeric vector: for a 1-sample test, the poulation mean under the null hypothesis; and for a 2-sample test, the difference between population means under the null hypothesis; defaults to a vector of 0s. |
assume.indep |
if |
var.equal |
for a 2-sample test, perform the pooled test: assume population variance-covariance matrices of the two variables are equal. |
... |
additional arguments, passed on to |
Value
An object of class htest with the following information:
statistic |
The |
parameter |
Degrees of freedom. |
p.value |
P-value. |
method |
Method specifics. |
null.value |
Null hypothesis mean or mean difference. |
alternative |
Always |
estimate |
Sample difference. |
covariance |
Estimated variance-covariance matrix of the estimate of the difference. |
covariance.x |
Estimated variance-covariance matrix of the estimate of the mean of |
covariance.y |
Estimated variance-covariance matrix of the estimate of the mean of |
It has a print method print.htest().
Note
For mcmc.list input, the variance for this test is
estimated with unpooled means. This is not strictly correct.
References
Hotelling, H. (1947). Multivariate Quality Control. In C. Eisenhart, M. W. Hastay, and W. A. Wallis, eds. Techniques of Statistical Analysis. New York: McGraw-Hill.
See Also
t.test()
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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