Vec-trick implementation (multiple times)

6 Ansichten (letzte 30 Tage)
ConvexHull
ConvexHull am 21 Aug. 2021
Bearbeitet: Bruno Luong am 14 Sep. 2023
Dear all,
the question is related to Tensorproduct. Since the question was not answered as intended, i want to revisit the question.
Introduction:
Suppose you have a matrix vector multiplication, where a matrix C with size (np x mq) is constructed by a Kronecker product of matrices A with size (n x m) and B with size (p x q). The vector is denoted v with size (mp x 1) or its vectorized version X with size (m x p).
In two dimensions this operation can be performed with O(npq+qnm) operations instead of O(mqnp) operations, see Wikipedia.
Expensive variant (in case of flops):
Cheap variant (in case of flops):
Main question:
I want to perform many of these operations at ones, e.g. 2500000. Example: n=m=p=q=7 with A=size(7x7), B=size(7x7), v=size(49x2500000).
In Tensorproduct i have implemented a MeX-C version of the cheap variant which is quite slower than a Matlab version of the expensive variant provided by Bruno Luong.
Is it possible to implement the cheap version in Matlab without looping?
  5 Kommentare
3 ältere Kommentare anzeigen
Bruno Luong
Bruno Luong am 23 Aug. 2021
Because smaller flops doesn't mean necessary faster. Memory access, cache, thread management are as well important, and which is fatest method probably depends on n=m=p=q.
ConvexHull
ConvexHull am 23 Aug. 2021
Bearbeitet: ConvexHull am 23 Aug. 2021
Yeah that's definitly the case here.
The main problem is that, if you want to perform the Vec-trick multiple times in a vectorized fashion you have to reorder the datastructure. After applying AX you cannot perform a Matrix-Matrix multiplication directly with B.
Stupid Memory access O.o!

Melden Sie sich an, um zu kommentieren.

Melden Sie sich an, um diese Frage zu beantworten.

Akzeptierte Antwort

ConvexHull
ConvexHull am 24 Aug. 2021
Bearbeitet: ConvexHull am 25 Aug. 2021
Here is a pure intrinsic Matlab version without loops, however with two transpose operations and quite slow.
n=7;m=7;p=7;q=7;
A = rand(n,m);
B = rand(p,q);
v = rand(m*p,500000,5);
n = 5;
C = kron(B,A);
tic
for i=1:n
v1 = reshape(C*reshape(v,49,[]),size(v));
end
toc % Elapsed time is 0.456353 seconds
tic
for i=1:n
v2 = reshape(reshape(B*reshape((A*reshape(v,7,[])).',7,[]),7*2500000,[]).',7,[]);
end
toc % Elapsed time is 3.879752 seconds
max(abs(v1(:)-v2(:)))
% 1.4211e-14
  22 Kommentare
20 ältere Kommentare anzeigen
Stefano Cipolla
Stefano Cipolla am 14 Sep. 2023
Bearbeitet: Stefano Cipolla am 14 Sep. 2023
Hi there! May I ask if you are aware of implementation of functions similar to "pagemtimes" but able to work with at least one sparse input? Alternatively do you see any easy workaround? More precisely I need someting like
pagemtimes(A, V)
where A is a nxnxn sparse real tensor and V is a real dense nxn matrix...
Bruno Luong
Bruno Luong am 14 Sep. 2023
Bearbeitet: Bruno Luong am 14 Sep. 2023
@Stefano Cipolla "sparse real tensor"
I'm not aware this native MATLAB class.
But you can put the A as diagonal block of n^2 x n^2 sparse matrix
SA = [A(:,:,1) 0 0 ... 0
0 A(:,:,2) 0 ... 0
...
9=0 0 ... A(:,:,n)]
Do the same expansion for V (with the same block) then solve it

Melden Sie sich an, um zu kommentieren.

Weitere Antworten (0)

Kategorien

Mehr zu Matrix Indexing finden Sie in Help Center und File Exchange

Tags

Produkte


Version

R2018a

Community Treasure Hunt

Find the treasures in MATLAB Central and discover how the community can help you!

Start Hunting!

Translated by