hotel1T2: Hotelling's multivariate version of the t-test

Description

Hotelling's test for testing one population mean vector.

Usage

hotel1T2(x, M, a = 0.05, R = 999, graph = FALSE)

Arguments

A matrix containing Euclidean data.

The significance level, set to 0.05 by default.

The hypothesized mean vector.

If R is 1 no bootstrap calibration is performed and the classical p-value via the F distribution is returned. If R is greater than 1, the bootstrap p-value is returned.

graph

A boolean variable which is taken into consideration only when bootstrap calibration is performed. IF TRUE the histogram of the bootstrap test statistic values is plotted.

Value

m: The sample mean vector.
info: The test statistic, the p-value, the critical value and the degrees of freedom of the F distribution (numerator and denominator). This is given if no bootstrap calibration is employed.
pvalue: The bootstrap p-value is bootstrap is employed.
runtime: The runtime of the bootstrap calibration.

Details

Multivariate hypothesis test for a one sample mean vector. This is the multivariate analogue of the one sample t-test. The p-value can be calculated either asymptotically or via bootstrap.

References

K.V. Mardia, J.T. Kent and J.M. Bibby (1979). Multivariate analysis.

Examples

Run this code

x <- MASS::mvrnorm(100, numeric(10), diag( rexp(10,0.5) ) )
hotel1T2(x, numeric(10), R = 1)
hotel1T2(x, numeric(10), R = 999, graph = TRUE)

Run the code above in your browser using DataLab