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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.

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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}
        }
    }
    return(y)
}

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

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