I repropose a question I asked this week and that, due to a missing tag, went unnoticed (basically it was viewed only by me).
I have two large vectors, values and indices. I need to sum the elements of values using indices as in this brute force example:
% The two vectors, which are given, look like this: N = 3e7; values = (rand(N, 1) > 0.3); indices = cumsum(ceil(4*rand(N, 1))); indices = [0; indices(find(indices > 1, 1, 'first'):find(indices < N, 1, 'last')); N]; HH = numel(indices) - 1; % This is the brute force solution tic out1 = zeros(HH, 1); for hh = 1:HH out1(hh) = sum(values((indices(hh)+1):indices(hh+1))); end toc
A more efficient way to do it is the following:
tic indices2 = diff(indices); new_inds = (1:HH+1)'; tmp = zeros(N, 1); tmp(cumsum(indices2)-indices2+1)=1; new_inds_long = new_inds(cumsum(tmp)); out2 = accumarray(new_inds_long, values); toc
A better solution is:
tic out3 = cumsum(values); out3 = out3(indices(2:end)); out3 = [out3(1); diff(out3)]; toc
The three solutions are equivalent
all(out1 == out2) all(out1 == out3)
Question is: since this is really a basic function, is there any faster, already known approach/function that does the same and that I may be overlooking or that I am just not aware of?