Repeated Indexing in MATLAB
Indexing is a popular topic I write about from time to time. Today I want to focus on what happens when there are duplicate indices.
Contents
Accessing Array Elements with Repeated Indices
Suppose I want to make numdups copies of the elements in odd locations in a vector, vec.
vec = [-40; exp(1); pi; 17; 42]; numdups = 3; oddlocs = 1:2:length(vec); locs = oddlocs(ones(1,numdups),:); locs = locs(:) newvec = vec(locs(:))
locs = 1 1 1 3 3 3 5 5 5 newvec = -40.0000 -40.0000 -40.0000 3.1416 3.1416 3.1416 42.0000 42.0000 42.0000
As you can see, since I requested some repeated values, MATLAB returned them to me.
Just in case you need some clarification, let me explain what's going on here. After creating my array and identifying the location of values I wish to repeat (oddlocs), I reshape this array into a column vector locs, and use this array, with its repeated values, to index into the rows I requested, including all the columns (but there is only 1 column here).
Here's an even simpler example that I will extend further.
subs = [1; 3; 3]; newvec = vec(subs)
newvec = -40.0000 3.1416 3.1416
I create my indices - and you can see that I want the first element followed by the 3rd one twice. Let's start with the right-hand side. From a semantic, or meaning, point of view, MATLAB creates a new temporary array extracting the pieces of vec requested. Following that, the values in the temporary array are assigned to the output newvec.
Here's how you can create a matrix from replicated columns. First by indexing,
threecols = vec(:,[1 1 1]) % or vec(:, ones(1,numdups)
threecols = -40.0000 -40.0000 -40.0000 2.7183 2.7183 2.7183 3.1416 3.1416 3.1416 17.0000 17.0000 17.0000 42.0000 42.0000 42.0000
by matrix multiplication
threecols = vec * [1 1 1] % or vec * ones(1,numdups)
threecols = -40.0000 -40.0000 -40.0000 2.7183 2.7183 2.7183 3.1416 3.1416 3.1416 17.0000 17.0000 17.0000 42.0000 42.0000 42.0000
and repmat.
threecols = repmat(vec,1,3)
threecols = -40.0000 -40.0000 -40.0000 2.7183 2.7183 2.7183 3.1416 3.1416 3.1416 17.0000 17.0000 17.0000 42.0000 42.0000 42.0000
You may also be interested in repelem.
Please note that you often do not need any of these techniques for certain computations that can be efficiently accomplished with the older bsxfun, and, more recently, the, in my opinion elegant, implicit expansion behavior (1, 2) that you can use to "expand" singleton dimensions.
Replicated Elements for Assignment to Output
Now let's see what we need to do if we have repeated indices in an assignment.
newvec = vec; newvec(subs) = vec(subs) + 10
newvec = -30.0000 2.7183 13.1416 17.0000 42.0000
What you see here is element 1 growing by 10 and same for element 3. However, we have repeated the element 3 index. So the computed right-hand side has element 1 and 2 copies of the updated element 3 - updated each in the same way, since that's what the code says to do. Remember I said that the MATLAB behavior is as if we placed the right-hand side into a temporary array. Once we have finished computing the right-hand side, MATLAB works on the assignment. Head top to bottom (even for multidimensional arrays, since MATLAB stores the data in a column-major format), and it replaces element 1 with a new value, element 3 with a new value, and then does the latter one more time. No extra accumulation of 10s for element 3. But maybe you wanted to accumulate the results for repeated elements, but it's not so tidy that you can simply use something like cumsum.
How to Achieve Accumulation Behavior
You may now that you can create and use sparse matrices in MATLAB. From the doc, you can see that you can accumulate values when constructing a sparse matrix. This has been so handy that eventually we made an analogous function, accumarray for non-sparse arrays as well.
Time for an example. I want to compute something like vec(subs) = vec(subs) + 10 with the difference being that I want repeated indices to accumulate the number of 10s represented by the repeated indices.
vec = (1:5)' subs = [1; 3; 3];
vec = 1 2 3 4 5
Here's the right-hand side as above.
vec(subs)
ans = 1 3 3
[uniquevals,~,idxUnique] = unique(subs)
uniquevals = 1 3 idxUnique = 1 2 2
Notice that I call the function unique and retrieve the third output, the actual locations of the unique indices as they appear in the output.
vec(uniquevals) = vec(uniquevals) + accumarray(idxUnique, 10)
vec = 11 2 23 4 5
Finally let me return to the initial vector from the beginning of the post. I'm guessing you fully understand what's happening here now.
subs = [1; 3; 3]; vec = [-40; exp(1); pi; 17; 42]; newvec = vec; [uniquesubs,~,idxUnique] = unique(subs); newvec(uniquesubs) = vec(uniquesubs) + accumarray(idxUnique, 10)
newvec = -30.0000 2.7183 23.1416 17.0000 42.0000
What Are Your Indexing Challenges When Handling Repeated Indices?
Wondering if you have had some challenges not covered here when dealing with repeated indices. Let me know here.
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