Clearing the upper section of a 3-dimensional matrix
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Given a stack of 2D-images, such that they form an x-by-y-by-z volume data set, I would like to delete any data that lies above (column-wise) a set of predetermined column indexes.
For example if:
A(:,:,1) = [1 1 1 A(:,:,2) = [1 1 1 A(:,:,3) = [1 1 1
1 1 1 1 1 1 1 1 1
1 1 1] 1 1 1] 1 1 1]
And the column indexes are defined such as (Where rows correspond to different images):
B = [3 2 1
1 2 3
3 3 3]
The result should be:
C(:,:,1) = [0 0 0 C(:,:,2) = [0 0 0 C(:,:,3) = [0 0 0
0 0 1 1 0 0 0 0 0
0 1 1] 1 1 0] 0 0 0]
My current method involves the use of for-loops, looping through each image and x-position individually, but this proves to be very slow when dealing with large sets of image data. My second thought was to use linear indexing, by converting the column indexes into an array of linear indexes I can easily generate a 3D matrix with 0's at the required column index, but the issue remains of removing the data above those points.
Is there a less computationally intensive method of tackling this problem that I'm missing?
Thanks for any assistance with the matter! :)
3 comentarios
Jan
el 21 de Feb. de 2014
I'm not sure if I see the connection between A, B and C. Please post your code.
Image Analyst
el 22 de Feb. de 2014
Well if B(1,1) = 3, then any elements in A(1,1) above plane 3 should be set to zero. But there are none, since A is only 3 planes high - there are no planes above 3 for A. So C(,1,) should be the same as A for all planes. So C(1,1,:) should equal 1,1,1, which is what A is in the (1,1) column. Yet your C does not show that so I guess I misunderstood or you didn't explain it correctly.
Robert
el 22 de Feb. de 2014
Respuesta aceptada
David Young
el 21 de Feb. de 2014
Editada: David Young
el 22 de Feb. de 2014
Try
Bt = permute(B, [3 2 1]);
mask = bsxfun(@ge, Bt, (1:size(A,1)).');
C = A;
C(mask) = 0;
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