Subtract corresponding nonzero element from each element in a vector

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CP
CP 2011 年 4 月 11 日
Ok, I want to create an M x M matrix A with the following.
Vec1=[0 1 1 0] Vec2=[1 3 5 7]
Then, matrix A has size M = size(Vec1) = size(Vec2) and all elements start at some constant value c.
I want to update the matrix A such that, for each index where Vec1 is not zero, create a matrix row where the row values are obtained by subtracting the value of Vec2 at that same index from each other value and getting the absolute values.
So in the above example, if I initialize matrix A as:
c c c c
c c c c
c c c c
c c c c
then, the first row stays the same (Vec 1 is zero) the second row becomes [abs(3-1), abs(3-3), abs(3-5), abs(3-7)], Third row becomes [abs(5-1), abs(5-3), abs(5-5), abs(5-7)]. Fourth row stays the same, so we end up with:
c c c c
2 0 2 4
4 2 0 2
c c c c
I would like to accomplish this without loops or possibly without even repmats and the like, since the matrices and vectors in question are huge.
Thanks!

採用された回答

Sean de Wolski
Sean de Wolski 2011 年 4 月 11 日
%EDIT again
Vec1=[0 1 1 0];
Vec1(~Vec1) = nan;
Vec2=[1 3 5 7];
C2 = bsxfun(@times,Vec1.',abs(bsxfun(@minus,Vec2.',Vec2)));
C2(isnan(C2)) = A(isnan(C2));
  7 件のコメント
CP
CP 2011 年 4 月 11 日
Hmm I tried profiling it and I was surprised to find that the line C2(isnan(C2)) = A(isnan(C2)) is taking up 40% of the entire calculation time of my whole code (which includes a lot of numeric integration and the like), while the bsxfun line is taking 23% of the time.
If you can think of any more efficient ways of getting it done it would be appreciated, but apparently moving 1024x1024 values around from matrix to matrix is more of a performance hit than I thought.
Sean de Wolski
Sean de Wolski 2011 年 4 月 11 日
You could remove one call to isnan by defining an index matrix:
idx = isnan(C2);
C2(idx) = A(idx);

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その他の回答 (2 件)

Walter Roberson
Walter Roberson 2011 年 4 月 11 日
In order to avoid having at least one temporary matrix the same size as A, you would need to update A "in-place", which would require using a loop.
Possibly you might be able to do the whole calculation with a single bsxfun() call; I would have to think more about how to handle the vectorization efficiently in the face of the fact that bsxfun() expects user-provided functions to work on column vectors.
  2 件のコメント
CP
CP 2011 年 4 月 11 日
I think a temporary matrix would be preferable to a loop in this case in terms of speed, so if you have a way to do it with a temporary matrix that could work.
Sean de Wolski
Sean de Wolski 2011 年 4 月 11 日
I wasn't able to figure out how do it all with one call to BSXFUN. I'd like to see it since it seems easily possible.

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Matt Fig
Matt Fig 2011 年 4 月 11 日
Try this for speed. On my machine it is much faster than the double BSXFUN call. I assume random V1 (your Vect1). .
.
.
EDIT Putting the call to ABS inside the loop is faster(?).
A = 3*ones(length(V1)); % This is your starting matrix... (Example)
TMP = 1:length(V1);
TMP = TMP(logical(V1));
for ii = TMP
A(ii,:) = abs(V2-V2(ii));
end
.
.
EDIT2
What was I thinking with that inner FOR loop? I was thinking I need to brew some more coffee...
  2 件のコメント
CP
CP 2011 年 4 月 11 日
Well I tried it with the inner for loop and I could not tell the difference between having the code or not having the code (e.g. compared to the rest of the code it's a trivial fraction). Pretty great given that it was like 75% of the overall code with the earlier method. I'll update to this version. Thanks a lot :)
Matt Fig
Matt Fig 2011 年 4 月 11 日
Never underestimate the power of the FOR loop! You're welcome. ;-)

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