Exponential empirical likelihood for a one sample mean vector hypothesis testing
Exponential empirical likelihood for a one sample mean vector hypothesis testing.
eel.test1(x, mu, tol = 1e-06, R = 1)
x |
A matrix containing Euclidean data. |
mu |
The hypothesized mean vector. |
tol |
The tolerance value used to stop the Newton-Raphson algorithm. |
R |
The number of bootstrap samples used to calculate the p-value. If R = 1 (default value), no bootstrap calibration is performed |
Multivariate hypothesis test for a one sample mean vector. This is a non parametric test and it works for univariate and multivariate data.
A list including:
p |
The estimated probabilities. |
lambda |
The value of the Lagrangian parameter λ. |
iter |
The number of iterations required by the newton-Raphson algorithm. |
info |
The value of the log-likelihood ratio test statistic along with its corresponding p-value. |
runtime |
The runtime of the process. |
Michail Tsagris
R implementation and documentation: Michail Tsagris mtsagris@uoc.gr and Giorgos Athineou <gioathineou@gmail.com>
Jing Bing-Yi and Andrew TA Wood (1996). Exponential empirical likelihood is not Bartlett correctable. Annals of Statistics 24(1): 365-369.
Owen A. B. (2001). Empirical likelihood. Chapman and Hall/CRC Press.
x <- Rfast::rmvnorm(100, numeric(10), diag( rexp(10, 0.5) ) ) eel.test1(x, numeric(10) ) el.test1(x, numeric(10) )
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