Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I am looking for a way to create a specified correlation between 2 variables, regardless of their distribution, given that the ordening is allowed to change. The motivation has to do with Bayesian statistics.

Imagine variable a which holds 100 random normal numbers, while variable b holds the numbers 1...100.

There will be 100 factorial permutations possible, and most of the time correlations between -0.95 and 0.95 will exist among all possible permutations of variable b.

I wrote a little script in R to try to find the correlation in an iterative way.

  • Iterate through all the indexes, checking whether the previous correlation is lower or higher than the sought correlation.

  • If the correlation is too low it will switch the number belonging to the index with the number belonging to a random index lower.

  • If the correlation is too high it will switch the number belonging to the index with the number belonging to a random index higher.

  • It will then check whether the new correlation is better than the old one, and keep the one closest to the wanted correlation.

  • It will keep going over all the indices in order (from 1 to 100), and after every iteration it then checks whether it is within the wanted correlation +/- tolerance and return the permuted variable.

Usually in around 2000 iterations the specified correlation will be found by a tolerance of 0.0005.

Note that index here is actually iteration

Index in the picture represents iterations.

My question is how to do this permutation in a smarter way, such that the correlation will be quicker found.

share|improve this question
I'd like to add that general information on how to approach this might already be useful... how to get a better understanding of how to improve finding correlation. –  PascalvKooten Apr 29 '13 at 18:25
Would it be possible somehow to use root finding? –  PascalvKooten Apr 29 '13 at 18:31
Have a look at en.wikipedia.org/wiki/Simulated_annealing. I would shoot for something like it, where at each iteration a lot of random permutations are considered and the best (closest in absolute value to your objective) is kept. Overall, something a little more random and maybe more vectorized than your high level description suggests. –  flodel Apr 29 '13 at 22:27
I am running the benchmark on it now. I realized my code had some small flaws. Your method will be more efficient I think when I try to extend this to more variables. Thank you. Maybe try to extend this comment so that it will make a nice answer? –  PascalvKooten Apr 30 '13 at 7:24

1 Answer 1

Based on flodel's idea to, at each iteration, propose several candidates. Here it actually tests all candidates; while this is fine for my variables of length 100, a sample should be preferred later for more cases.

AnnealCor <- function(x, y, corpop, tol) {  
    while(abs(cor(x,y) - corpop) > tol) {       
        for (i in 1:length(y)) {
            numbers <- 1:length(y)
            correlation <- 1:length(y)
            for (j in numbers) {
                switcher <- y
                switcher[c(i,j)] <- y[c(j,i)]
                correlation[j] <- cor(x, switcher) 
        tokeep <- which(abs(correlation - corpop) ==  min(abs(correlation - corpop)))[1]
        y[c(i, tokeep)] <- y[c(tokeep,i)]
        if (abs(cor(x,y) - corpop) < tol) {break}

Benchmark time based on 100 repetitions has a median of 200 miliseconds.

share|improve this answer

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.