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Сan anyone shine a light to my matlab program? I have data from two sensors and i'm doing a kNN classification for each of them separately. In both cases training set looks like a set of vectors of 42 rows total, like this:

[44 12 53 29 35 30 49;

 54 36 58 30 38 24 37;..]

Then I get a sample, e.g. [40 30 50 25 40 25 30] and I want to classify the sample to its closest neighbor. As a criteria of proximity I use Euclidean metrics, sqrt(sum(Y2)), where Y is a difference between each element and it gives me an array of distances between Sample and each Class of Training Set.

So, two questions:

  • Is it possible to convert distance into distribution of probabilities, something like: Class1: 60%, Class 2: 30%, Class 3: 5%, Class 5: 1%, etc.

added: Up to this moment I'm using formula: probability = distance/sum of distances, but I cannot plot a correct cdf or histogram. This gives me a distribution in some way, but I see a problem there, because if distance is large, for example 700, then the closest class will get a biggest probability, but it'd be wrong because the distance is too big to be compared with any of classes.

  • If I would be able to get two probability density functions, I guess then I would do some product of them. Is it possible?

Any help or remark is highly appreciated.

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Perhaps you meant probability = distance/sum of distances –  Rafael Monteiro May 4 '14 at 18:41
probability should always add up to 1 - so you should figure out that your normalization is (some number related to one state) / (sum of numbers corresponding to all states). What that means in your case is a bit hard to judge. –  Floris May 4 '14 at 19:23
thanks for your comments, guys, i understand that total prob. must be equal to 1 and probability = distance/sum of distances satisfy it. –  niko_dry May 4 '14 at 19:34
But imagine the situation: minimal distance is 50, the 2nd minimum is 100, the 3rd minimum is 500, while the sum is 30.000, what i obtain from this formula would be: 0,16%, 0.3%, 1.6%...and let's say 33% for the farthest one, it's not the probability, more like % of error, but how to make in more concise? –  niko_dry May 4 '14 at 19:42

1 Answer 1

You could try to inverse your distances to get a likelihood measure. I.e. the bigger the distance x, the smaller the inverse of it. Then, you can normalize as in probability = (1/distance) / (sum (1/distance) )

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