Announcing Stack Overflow Documentation

We started with Q&A. Technical documentation is next, and we need your help.

Whether you're a beginner or an experienced developer, you can contribute.

Sign up and start helping → Learn more about Documentation →

The following function calculates the Gaussian Kernel and is part of the Kernel Ridge Regression algorithm that I wrote. I was wondering how could I modify this function properly in order to improve the execution time (i.e. get rid of the two for loops). Any ideas?

function [K] = calculate_krr_gaussiankernel(Xi,Xj,S)
    K = zeros(size(Xi,1),size(Xj,1));
    for Ixi = 1:size(Xi,1),
        for Ixj = 1:size(Xj,1),
            K(Ixi,Ixj) = exp((-norm(Xi(Ixi,:) - Xj(Ixj,:)) .^ 2) ./ (2 * (S .^ 2)));

EDIT: The formula: enter image description here

share|improve this question

Here's a version that's most likely faster. It might however give rise to memory issues for large Xi/Xj.

function K = calculate_krr_gaussiankernel(Xi, Xj, S)

  %# create an array of difference between Xi(r,:) and Xj(s,:) for all r,s
  delta = bsxfun(@minus, permute(Xi,[1 3 2]), permute(Xj,[3 1 2]));

  %# calculate the squared norm
  ssq = sum(delta.^2, 3);

  %# calculate the kernel
  K = exp(-ssq./(2*S.^2));

Here's an explanation of what I'm doing:

  • the bsxfun line: I reshape the inputs, such that I can get, at every (i,j), the difference vector in the third dimension
  • the ssq line simply takes the sum of squares. I could take the square root here and thus get the norm, but since we'll square that again, anyway, there's no point in that.
  • the final line implements the formula in the OP, where ssq is the squared norm of the differences.
share|improve this answer
@RodyOldenhuis: Thanks for the clarification! – Jonas Aug 16 '12 at 11:21
@eualin: I have added an explanation of the individual steps. – Jonas Aug 16 '12 at 14:15

You can certainly double the speed (approximately) since K is symmetric. In addition you can calculate the norm of the difference vector and then make a single call to exp() which may be faster than calling exp() over and over again. Putting this together:

function [K] = calculate_krr_gaussiankernel(Xi,Xj,S)
    arg = zeros(size(Xi,1),size(Xj,1));
    for Ixi = 1:size(Xi,1),
        % diagonal elements can be done in outer loop:
        arg(Ixi,Ixi) = norm(Xi(Ixi,:) - Xj(Ixi,:));
        for Ixj = Ixi+1:size(Xj,1), % off-diagonals done once and copied
            arg(Ixi,Ixj) = norm(Xi(Ixi,:) - Xj(Ixj,:));
            arg(Ixj,Ixi) = arg(Ixi,Ixj);

K = exp(( -arg.^ 2) ./ (2 * (S .^ 2)))
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.