mvar2.1976PL: Two-sample Simultaneous Test of Mean and Variance by Perng...

View source: R/mvar2_1976PL.R

mvar2.1976PLR Documentation

Two-sample Simultaneous Test of Mean and Variance by Perng and Littell (1976)

Description

Given two univariate samples x and y, it tests

H_0 : μ_x = μ_y, σ_x^2 = σ_y^2 \quad vs \quad H_1 : \textrm{ not } H_0

using Fisher's method of merging two p-values.

Usage

mvar2.1976PL(x, y)

Arguments

x

a length-n data vector.

y

a length-m data vector.

Value

a (list) object of S3 class htest containing:

statistic

a test statistic.

p.value

p-value under H_0.

alternative

alternative hypothesis.

method

name of the test.

data.name

name(s) of provided sample data.

References

\insertRef

perng_test_1976SHT

Examples

## CRAN-purpose small example
x = rnorm(10)
y = rnorm(10)
mvar2.1976PL(x, y)

## Not run: 
## empirical Type 1 error 
niter   = 1000
counter = rep(0,niter)  # record p-values
for (i in 1:niter){
  x = rnorm(100)  # sample x from N(0,1)
  y = rnorm(100)  # sample y from N(0,1)
  
  counter[i] = ifelse(mvar2.1976PL(x,y)$p.value < 0.05, 1, 0)
}

## print the result
cat(paste("\n* Example for 'mvar2.1976PL'\n","*\n",
"* number of rejections   : ", sum(counter),"\n",
"* total number of trials : ", niter,"\n",
"* empirical Type 1 error : ",round(sum(counter/niter),5),"\n",sep=""))

## End(Not run)


kisungyou/SHT documentation built on Oct. 15, 2022, 3:18 p.m.