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How do you normalize a M*N vector, such that the sum of all its elements is now equal to 1. I browsed online a little, and nothing seems to quite match what I need. Thanks!

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Have you tried to find the sum of all elements and divide each element by that sum? –  Vladimir Apr 10 '12 at 19:57
    
Little note: The sum of all entries of a vector is only a norm if all entries are non-negative. In general you probably want the sum of the absolute values of your entries to equal 1. –  Anthales Apr 10 '12 at 20:11
    
Yes, I have negative values too... –  Eddie Apr 10 '12 at 20:14
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2 Answers 2

up vote 1 down vote accepted

You add up all the elements, then divide each element by the sum.

Obviously, the division (at least) needs to be in floating point. Since that indicates a floating point matrix, doing the summing while maintaining maximum accuracy will be non-trivial.

Just for example, if you have one large element, and a lot of small elements, you'll probably get a more accurate result from adding all the small elements together, then adding that sum to the large element, than if you added each small element to the large one individually.

Edit: I suppose I should add that the usual way to deal with this is called Kahan summation, after the high guru of numerical analysis, William Kahan.

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i think you have to divide every vector component by the euklidean distance of the vector

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This does not provide an answer to the question. To critique or request clarification from an author, leave a comment below their post - you can always comment on your own posts, and once you have sufficient reputation you will be able to comment on any post. –  Mohammad AbuShady Feb 1 at 18:07
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