I expected I could proof, if a sample of p-variate normal random vectors has a theoretical mean value, by the hotellings test. But a crosscheck with ks.test, if the distribution from the HottelingsT2 function matches the distribution of the test statistic which is used by HottelingsT2-Test failed. It means that the simulated experiments has not the mean value 0, but obviously they have. So there should be something wrong in context. Are there some mistakes?

```
require(mvtnorm)
require(ICSNP)
subject<-50
treatment<-4
V<-matrix(c(644.03100226056, 184.319025225855, 572.5312199559, 143.106678641056, 184.319025225855, 73.5310268006399, 230.838267981476, 130.977532385651, 572.5312199559, 230.838267981476, 736.378779002912, 429.445506266528, 143.106678641056, 130.977532385651, 429.445506266528, 435.124191935888),treatment,treatment)
experiment<-list()
R<-3000
seed<-split(1:(R*subject),1:R)
for(i in 1:R){
e<-c()
for(j in 1:subject){
set.seed(seed[[i]][j])
e<-c(e,rmvnorm(mean=rep(0,treatment),sigma=V,n=1,method="chol"))
}
experiment<-c(experiment,list(matrix(e,subject,treatment,byrow=T)))
}
p.values<-c()
for(e in experiment){
fit<-lm(e~1)
p.values<-c(p.values,HotellingsT2(e, mu=rep(0,treatment))[["p.value"]])
}
ks.test(p.values, punif,alternative = "two.sided")
```