My question is on the permutation of correlation coefficients.

```
A<-data.frame(A1=c(1,2,3,4,5),B1=c(6,7,8,9,10),C1=c(11,12,13,14,15 ))
B<-data.frame(A2=c(6,7,7,10,11),B2=c(2,1,3,8,11),C2=c(1,5,16,7,8))
cor(A,B)
# A2 B2 C2
# A1 0.9481224 0.9190183 0.459588
# B1 0.9481224 0.9190183 0.459588
# C1 0.9481224 0.9190183 0.459588
```

I obtained this correlation and then wanted to perform permutation tests to check if the correlation still holds.

I did the permutation as follows:

```
A<-as.vector(t(A))
B<-as.vector(t(B))
corperm <- function(A,B,1000) {
# n is the number of permutations
# x and y are the vectors to correlate
obs = abs(cor(A,B))
tmp = sapply(1:n,function(z) {abs(cor(sample(A,replace=TRUE),B))})
return(1-sum(obs>tmp)/n)
}
```

The result was

```
[1] 0.645
```

and using "cor.test"

```
cor.test(A,B)
Pearson's product-moment correlation
data: A and B
t = 0.4753, df = 13, p-value = 0.6425
alternative hypothesis: true correlation is not equal to 0
95 percent confidence interval:
-0.4089539 0.6026075
sample estimates:
cor
0.1306868
```

How could I draw a plot or a histogram to show the actual correlation and the permuted correlation value from the permuted data ???