By default, all built-in functions for computing correlation or covariance return a matrix. I am trying to write an efficient function that will compute the correlation between a seed region and various other regions, but I do not need the correlations between the other regions. I assume that computing the full correlation matrix would therefore be inefficient.
I could instead compute a the correlation matrix between each region and the seed region, choose one of the off diagonal points and store it, but I feel like looping in this situation is also inefficient.
To be more concrete, each point in my 3-dimensional space has a time dimension. I am attempting to compute the mean correlation between a given point and all points in space within a given radius. I want to repeat this procedure hundreds of thousands of times, for many different radius lengths, and so on, so I would like for this to be as efficient as possible.
So, what is the best way to compute the correlation between a single vector and several others, without computing correlations that I will just ignore?
Thank you, Chris
EDIT: Here is my code now...
function [corrMap] = TIME_meanCorrMap(A,radius) % Even though the variable is "radius", we work with cubes for simplicity... % So, the radius is the distance (in voxels) from the center of the cube an edge. denom = ((radius*2)^3)-1; dim = size(A); corrMap = zeros(dim(1:3)); for x = radius+1:dim(1)-radius rx = [x-radius : x+radius]; for y = radius+1:dim(2)-radius ry = [y-radius : y+radius]; for z = radius+1:dim(3)-radius rz = [z-radius : z+radius]; corrCoefs = zeros(1,denom); seed = A(x,y,z,:); i=0; for xx = rx for yy = ry for zz = rz if ~all([x y z] == [xx yy zz]) i = i + 1; temp = corrcoef(seed,A(xx,yy,zz,:)); corrCoeffs(i) = temp(1,2); end end end end corrMap = mean(corrCoeffs); end end end
EDIT: Here are some more times to supplement the accepted answer. Using bsxfun() to do normalization, and matrix multiplication to compute correlations:
tic; for i=1:10000 x=rand(100); xz = bsxfun(@rdivide,bsxfun(@minus,x,mean(x)),std(x)); cc = xz(:,2:end)' * xz(:,1) ./ 99; end; toc Elapsed time is 6.928251 seconds.
Using zscore() to normalize, matrix multiplication to compute correlations:
tic; for i=1:10000 x=rand(100); xz = zscore(x); cc = xz(:,2:end)' * xz(:,1) ./ 99; end; toc Elapsed time is 7.040677 seconds.
Using bsxfun() to normalize, and corr() to compute correlations.
tic; for i=1:10000 x=rand(100); xz = bsxfun(@rdivide,bsxfun(@minus,x,mean(x)),std(x)); cc = corr(x(:,1),x(:,2:end)); end; toc Elapsed time is 11.385707 seconds.