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# Weighted Pearson's Correlation?

I have a `2396x34 double matrix` named `y` wherein each row (2396) represents a separate situation consisting of 34 consecutive time segments.

I also have a `numeric[34]` named `x` that represents a single situation of 34 consecutive time segments.

Currently I am calculating the correlation between each row in `y` and `x` like this:

`crs[,2] <- cor(t(y),x)`

What I need now is to replace the `cor` function in the above statement with a weighted correlation. The weight vector `xy.wt` is 34 elements long so that a different weight can be assigned to each of the 34 consecutive time segments.

I found the `Weighted Covariance Matrix` function `cov.wt` and thought that if I first `scale` the data it should work just like the `cor` function. In fact you can specify for the function to return a correlation matrix as well. Unfortunately it does not seem like I can use it in the same manner because I cannot supply my two variables (`x` and `y`) separately.

Does anyone know of a way I can get a weighted correlation in the manner I described without sacrificing much speed?

Edit: Perhaps some mathematical function could be applied to `y` prior to the `cor` function in order to get the same results that I'm looking for. Maybe if I multiply each element by `xy.wt/sum(xy.wt)`?

Edit #2 I found another function `corr` in the `boot` package.

``````corr(d, w = rep(1, nrow(d))/nrow(d))

d
A matrix with two columns corresponding to the two variables whose correlation we wish to calculate.

w
A vector of weights to be applied to each pair of observations. The default is equal weights for each pair. Normalization takes place within the function so sum(w) need not equal 1.
``````

This also is not what I need but it is closer.

Edit #3 Here is some code to generate the type of data I am working with:

``````x<-cumsum(rnorm(34))
y<- t(sapply(1:2396,function(u) cumsum(rnorm(34))))
xy.wt<-1/(34:1)

crs<-cor(t(y),x) #this works but I want to use xy.wt as weight
``````
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You can go back to the definition of the correlation.

``````f <- function( x, y, w = rep(1,length(x))) {
stopifnot( length(x) == dim(y)[2] )
w <- w / sum(w)
# Center x and y, using the weighted means
x <- x - sum(x*w)
y <- y - apply( t(y) * w, 2, sum )
# Compute the variance
vx <- sum( w * x * x )
vy <- rowSums( w * y * y ) # Incorrect: see Heather's remark, in the other answer
# Compute the covariance
vxy <- colSums( t(y) * x * w )
# Compute the correlation
vxy / sqrt(vx * vy)
}
f(x,y)[1]
cor(x,y[1,]) # Identical
f(x, y, xy.wt)
``````
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Excellent! That did it. Thanks again! I thought that functions written in R would be substantially slower than ones built into R... but I guess not? – Mike Furlender Feb 27 '12 at 9:15

Unfortunately the accepted answer is wrong when `y` is a matrix of more than one row. The error is in the line

``````vy <- rowSums( w * y * y )
``````

We want to multiply the columns of `y` by `w`, but this will multiply the rows by the elements of `w`, recycled as necessary. Thus

``````> f(x, y[1, , drop = FALSE], xy.wt)
[1] 0.103021
``````

is correct, because in this case the multiplication is performed element-wise, which is equivalent to column-wise multiplication here, but

``````> f(x, y, xy.wt)[1]
[1] 0.05463575
``````

gives a wrong answer due to the row-wise multiplication.

We can correct the function as follows

``````f2 <- function( x, y, w = rep(1,length(x))) {
stopifnot(length(x) == dim(y)[2] )
w <- w / sum(w)
# Center x and y, using the weighted means
x <- x - sum(x * w)
ty <- t(y - colSums(t(y) * w))
# Compute the variance
vx <- sum(w * x * x)
vy <- colSums(w * ty * ty)
# Compute the covariance
vxy <- colSums(ty * x * w)
# Compute the correlation
vxy / sqrt(vx * vy)
}
``````

and check the results against those produced by `corr` from the `boot` package:

``````> res1 <- f2(x, y, xy.wt)
> res2 <- sapply(1:nrow(y),
+                function(i, x, y, w) corr(cbind(x, y[i,]), w = w),
+                x = x, y = y, w = xy.wt)
> all.equal(res1, res2)
[1] TRUE
``````

which in itself gives another way that this problem could be solved.

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@vincentzoonekynd Perhaps you should take a look at this and comment? – Andrie Jul 19 '12 at 11:35
There is indeed a bug in my answer (I wanted to delete it, but it is not possible to delete accepted answers). I usually expect a warning when I multiply objects with incorrect dimensions, but there was none in this case... – Vincent Zoonekynd Jul 19 '12 at 13:38
I thought afterwards it would have been better to add a comment and let you edit your answer, sorry about that. At least the bug is flagged up now and you still get the credit for doing most of the work! – Heather Turner Jul 19 '12 at 15:32

Here is a generalization to compute the weighted Pearson correlation between two matrices (instead of a vector and a matrix, as in the original question):

``````matrix.corr <- function (a, b, w = rep(1, nrow(a))/nrow(a))
{
# normalize weights
w <- w / sum(w)

# center matrices
a <- sweep(a, 2, colSums(a * w))
b <- sweep(b, 2, colSums(b * w))

# compute weighted correlation
t(w*a) %*% b / sqrt( colSums(w * a**2) %*% t(colSums(w * b**2)) )
}
``````

Using the above example and the correlation function from Heather, we can verify it:

``````> sum(matrix.corr(as.matrix(x, nrow=34),t(y),xy.wt) - f2(x,y,xy.wt))
[1] 1.537507e-15
``````

In terms of calling syntax, this resembles the unweighted `cor`:

``````> a <- matrix( c(1,2,3,1,3,2), nrow=3)
> b <- matrix( c(2,3,1,1,7,3,5,2,8,1,10,12), nrow=3)
> matrix.corr(a,b)
[,1]      [,2] [,3]      [,4]
[1,] -0.5 0.3273268  0.5 0.9386522
[2,]  0.5 0.9819805 -0.5 0.7679882
> cor(a, b)
[,1]      [,2] [,3]      [,4]
[1,] -0.5 0.3273268  0.5 0.9386522
[2,]  0.5 0.9819805 -0.5 0.7679882
``````
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