In the Matlab programs I use I often have to average within a matrix (interpolation). The most straightforward way is to add the matrix and a shifted one (avg). However you could do the same operation using matrix multiplication (avg2). I noticed a considerable speed increase in the case of using matrix multiplication in the case of large matrices.
Could anyone explain why Matlab is able to process this multiplication faster than adding the same matrix? Also what are the possible downsides of using avg2() in respect to avg()?
Difference in runtime was a factor ~6 for this case (n=500).
function  = speed() %Speed test for averaging a matrix n = 500; A = rand(n,n); tic for i=1:100 avg(A); end toc tic for i=1:100 avg2(A); end toc end function B = avg(A,k) if nargin<2, k = 1; end if size(A,1)==1, A = A'; end if k<2, B = (A(2:end,:)+A(1:end-1,:))/2; else B = avg(A,k-1); end if size(A,2)==1, B = B'; end end function B = avg2(A,k) if nargin<2, k = 1; end if size(A,1)==1, A = A'; end if k<2, m = size(A,1); e = ones(m,1); S = spdiags(e*[1 1],-1:0,m,m-1)'/2; B = S*A; else B = avg2(A,k-1); end if size(A,2)==1, B = B'; end end