How can I vectorize this function with nested FOR loop?
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I have two for loops.L is one matrix of random numbers between 0,1 with dimension 24*100000.I want to vectorize it but i can't. because current code is very slow and take a long time.please help me.
K=zeros(100000,1);
T=zeros(100000,1);
for i=1:100000
for j=1:100000
K(j,1)=exp(-4*norm(L(:,i)-L(:,j))^2/norm(L(:,i))^2);
end
T(i,:)=sum(K)-1;
end
2 Commenti
Bob Thompson
il 2 Lug 2019
(L(:,i)-L(:,j))
This is what is going to make it difficult to vectorize. I believe there is a command to calculate this for you, but I'm not sure what exactly it is. It might be easier to do some research for this specifically, rather than the vectorization.
Why do you want to vectorize the code? There is no general benefit in doing this. Does the current code run too slow? Then an acceleration is the way to go. Vectorizing can improve the speed, but this is not in general.
To optimize the code, we need the chance to run it. Without meaningful input arguments, this is hard. So please provide L.
norm(x)^2 calculates an expensive square root only to square the result afterwards.
Do oyu have the parallel processing toolbox? A parfor might be very useful.
Risposta accettata
Using mat2tiles
chunksize=10000;
Lc=mat2tiles(L.',[chunksize,24]);
normL=mat2tiles(vecnorm(L,2,1), [1, chunksize]);
N=numel(Lc);
Tc=cell(N);
for i=1:N
for j=1:N
E=pdist2(Lc{i},Lc{j})./normL{j};
Tc{i,j}=sum( exp(-4*E.^2) ,1);
end
end
T=sum( cell2mat(Tc) ,1).'-1;
18 Commenti
abtin irani
il 2 Lug 2019
What Matlab version are you using? In any case, try this revision:
chunksize=10000;
Lc=mat2tiles(L.',[chunksize,24]);
normL=mat2tiles(sqrt(sum(L.^2,1)), [1, chunksize]);
N=numel(Lc);
Tc=cell(N);
for i=1:N
for j=1:N
E=pdist2(Lc{i},Lc{j})./normL{j};
Tc{i,j}=sum( exp(-4*E.^2) ,1);
end
end
T=sum( cell2mat(Tc) ,1).'-1;
abtin irani
il 2 Lug 2019
Modificato: abtin irani
il 2 Lug 2019
Matt J
il 2 Lug 2019
You need to download it from the link I gave you.
abtin irani
il 2 Lug 2019
abtin irani
il 3 Lug 2019
Modificato: abtin irani
il 3 Lug 2019
Matt J
il 3 Lug 2019
What Matlab version do you have?
abtin irani
il 3 Lug 2019
Matt J
il 3 Lug 2019
You should upgrade to R2016b or higher, if you can. Barring that, just modify this line
E=bsxfun(@rdivide, pdist2(Lc{i},Lc{j}) , normL{j} );
abtin irani
il 3 Lug 2019
Modificato: Matt J
il 3 Lug 2019
you helped me alot.thanks alot .it worked.
You're welcome, but if so, please Accept-click the answer.
it isn't normL{i}?
I don't think so, but you can test both versions to be sure.
can i ask you another thing.how can i vectorize this loop?
That would just be,
P=pdist2(L(:,6).',L.').'/N
It may help you to read the pdist2 documentation to see how it works, and all its options.
abtin irani
il 3 Lug 2019
Matt J
il 3 Lug 2019
Yes, the error message makes sense. What question do you have about it?
abtin irani
il 3 Lug 2019
abtin irani
il 4 Lug 2019
Più risposte (1)
Jan
il 4 Lug 2019
n = 1000;
L = rand(24, n);
T = zeros(n, 1);
for i=1:n
K = exp(-4*sum((L(:,i) - L) .^ 2, 1) ./ sum(L(:,i).^2, 1));
T2(i) = sum(K, 2) - 1;
end
This is 100 times faster than the original version for n=1000.
With parfor instead of for a further acceleration is possible.
To my surprise the above code is faster than this, which omits the repeated squaring:
T = zeros(n,1);
L2 = L .^ 2;
for i=1:n
K = exp(-4*sum((L2(:,i) - 2*L(:,i).*L + L2), 1) ./ sum(L2(:,i), 1));
T(i) = sum(K, 2)-1;
end
2 Commenti
abtin irani
il 4 Lug 2019
Jan
il 4 Lug 2019
You use Matlab < R2016b. Then:
K = exp(-4*sum((L2(:,i) - bsxfun(@times, 2*L(:,i), L) + L2), 1) ...
./ sum(L2(:,i), 1));
But the first version seems to be faster.
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