Efficient algorithm for a duplication matrix

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Youngkyu Kim
Youngkyu Kim il 27 Lug 2019
Commentato: Jan il 5 Ago 2021
Can anybody help me to design a Matlab code function that creates a duplication matrix D?
Thanks in advnace.
My codes is very slow...
Any ideas to speed it up?
n=1000;
% Duplication matrix: vec(P)=Dvech(P)
tic
m=1/2*n*(n+1);
nsq=n^2;
DT=sparse(m,nsq);
for j=1:n
for i=j:n
ijth=(j-1)*n+i;
jith=(i-1)*n+j;
vecTij=sparse(ijth,1,1,nsq,1);
vecTij(jith,1)=1;
k=(j-1)*n+i-1/2*j*(j-1);
uij=sparse(k,1,1,m,1);
DT=DT+uij*vecTij';
end
end
D=DT';
toc
% test duplication matrix
C=rand(n,n);
P=1/2*(C+C');
vechP=nonzeros(tril(P));
vecP=P(:);
err_D=vecP-D*vechP;
max(err_D(:))
min(err_D(:))
  2 Commenti
Walter Roberson
Walter Roberson il 27 Lug 2019
What are vec and vech in this context?
Stephan
Stephan il 27 Lug 2019
The question Text is complete copied from Wikipedia- we can assume it is meant: https://en.m.wikipedia.org/wiki/Vectorization_%28mathematics%29?wprov=sfla1

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Jan
Jan il 28 Lug 2019
Modificato: Jan il 4 Ago 2021
For n=300 this needs 1.3 sec instead of 27.5 sec:
tic
m = n * (n + 1) / 2;
nsq = n^2;
D = spalloc(nsq, m, nsq);
row = 1;
a = 1;
for i = 1:n
b = i;
for j = 0:i-2
D(row + j, b) = 1;
b = b + n - j - 1;
end
row = row + i - 1;
for j = 0:n-i
D(row + j, a + j) = 1;
end
row = row + n - i + 1;
a = a + n - i + 1;
end
toc
But it is much faster to create the index vector at first instead of accessing the sparse matrix repeatedly:
tic
m = n * (n + 1) / 2;
nsq = n^2;
r = 1;
a = 1;
v = zeros(1, nsq);
for i = 1:n
b = i;
for j = 0:i-2
v(r) = b;
b = b + n - j - 1;
r = r + 1;
end
for j = 0:n-i
v(r) = a + j;
r = r + 1;
end
% BUGFIX: Omit "r = r + n - i + 1;" Thanks Trisha Phippard
a = a + n - i + 1;
end
D2 = sparse(1:nsq, v, 1, nsq, m);
toc
Now I get 0.013 sec for n=300. Finally vectorize the 2 inner loops:
tic
m = n * (n + 1) / 2;
nsq = n^2;
r = 1;
a = 1;
v = zeros(1, nsq);
cn = cumsum(n:-1:2); % [EDITED, 2021-08-04], 10% faster
for i = 1:n
% v(r:r + i - 2) = i - n + cumsum(n - (0:i-2));
v(r:r + i - 2) = i - n + cn(1:i - 1); % [EDITED, 2021-08-04]
r = r + i - 1;
v(r:r + n - i) = a:a + n - i;
r = r + n - i + 1;
a = a + n - i + 1;
end
D2 = sparse(1:nsq, v, 1, nsq, m);
toc
0.011 sec. A speedup of factor 2500 for n=300. And 0.12 sec for n=1000. Nice! :-)
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Jan
Jan il 5 Ago 2021
The list C of my code needs 6GB of RAM, if all 1000 matrices are created. Writing it as -v7.3 MAT file creates an 1GB file. Reading it takes 15 seconds on a HDD instead of 35 seconds of creating all matrices dynamically.

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