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I have a column vector of data in variable vdata and a list of indeces idx. I want to access vdata at the indeces x before and x after each index in idx. One way I would do it in a for loop is:

x = 10;
accessed_data = [];
for (ii = 1:length(idx))
    accessed_data = vdata(idx-x:idx+x);

Is there a way to do this in a vectorized function? I found a solution to a very similar question here: Addressing multiple ranges via indices in a vector but I don't understand the code :(.

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What result do you want exactly? A matrix with one row for each ii? –  Luis Mendo Jul 29 '13 at 21:07
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3 Answers

up vote 2 down vote accepted

Assuming min(idx)-x>0 and max(idx)+x<=numel(vdata) then you can simply do

 iidx = bsxfun(@plus, idx(:), -x:x); % create all indices
 accessed_data = vdata( iidx );
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When did they start allowing you to apply bsxfun to two transposed vectors? I always remember having to build a matrix first so that the non-singleton dimensions of the two input arrays would match each other? But now I see this works in R2012b. Am I confused? –  horchler Jul 29 '13 at 21:13
@horchler AFAIK it has always been this way. see bsxfun tag wiki for more examples (feel welcome to contribute). –  Shai Jul 29 '13 at 21:18
The doc for bsxfun from R2007a (the function's debut) seems to back you up. I don't know were I picked up that idea. –  horchler Jul 29 '13 at 21:30
BSXFUN was spot on. I had never heard of this function before but this is exactly what I needed. Thanks Shai and horchler! –  navr91 Jul 29 '13 at 21:38
@navr91 bsxfun is a GREAT function. visit its bsxfun wiki –  Shai Jul 30 '13 at 5:11
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One scheme that uses direct indexing instead of a for loop:

xx = (-x:x).';                            % Range of indices
idxx = bsxfun(@plus,xx(:,ones(1,numel(idx))),idx(:).'); % Build array
idxx = idxx(:);                           % Columnize to interleave columns
idxx = idxx(idxx>=1&idxx<=length(vdata)); % Make sure the idx+/-x is valid index
accessed_data = vdata(idxx);              % Indices of data

The second line can be replaced with a form of the first line from @Shai's answer. This scheme checks that all of the resultant indices are valid. Because some might have to be removed, you could end up with a ragged array. One way to solve this is to use cell arrays, but here I just make idxx a vector, and thus accessed_data is as well.

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This gives the solution in a matrix, with one row for each value in idx. It assumes that all values in idx are greater than or equal to x, and less than or equal to length(vdata)-x.

% Data
x = 10;
idx = [12 20 15];
vdata = 1:100;

ind = repmat(-x:x,length(idx),1) + repmat(idx(:),1,2*x+1);
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using repmat twice instead of bsxfun??? why??? –  Shai Jul 29 '13 at 21:19
Sheer ignorance, I'm afraid. Is bsxfun faster? –  Luis Mendo Jul 29 '13 at 21:22
check out the bsxfun tag wiki for more info –  Shai Jul 29 '13 at 21:26
@Shai: In the old days repmat was not implemented as a native function and it was definitely true that it could be slow. Less so now (I'm not sure which version this happened in). Also, on my own hardware, I've seen that bsxfun is actually slower than replicating methods for sufficiently small arrays. Not sure why (memory allocation speed vs. CPU speed?). However, if one is to optimize for the worst case, then bsxfun is way to go. –  horchler Jul 29 '13 at 21:36
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