# 'Probability' of a K-nearest neighbor like classification

I've a small set of data points (around 10) in a 2D space, and each of them have a category label. I wish to classify a new data point based on the existing data point labels and also associate a 'probability' for belonging to any particular label class.

Is it appropriate to label the new point based on the label to its nearest neighbor( like a K-nearest neighbor, K=1)? For getting the probability I wish to permute all the labels and calculate all the minimum distance of the unknown point and the rest and finding the fraction of cases where the minimum distance is lesser or equal to the distance that was used to label it.

Thanks

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Roweis uses a probabilistic framework with KNN in his publication Neighbourhood Component Analysis. The idea is to use a "soft" nearest neighbour classification, where the probability that a point i uses another point j as its neighbour is defined by

,

where d_ij is the euclidean distance between point i and j.

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thanks bayer,I'll check that –  WoA Feb 23 '11 at 17:07
Please note - it should be -d_ij (negative distance) in both exponents so that the probability is inversely proportional to distance! –  Maciek Gryka May 19 '11 at 14:11

The are no probabilities for such K-nearest classification method because it is discriminative classification as well as SVM. There are should be used postporcess for learning probabilities on unseen data with generative model like logistic regression. 1. learn K nearest classifier 2. Train logistic regression on distance and average distance to K nearest for validation data.

Check for details LibSVM article.

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Sort the distances to the 10 centres; they could be
1 5 6 ... — one near, others far
1 1 1 5 6 ... — 3 near, others far
... lots of possibilities.
You could combine the 10 distances to a single number, e.g. 1 - (nearest / average) ** p,
but that's throwing away information. (Different powers p makes the hills around the centres steeper or flatter.)

If your centres are really Gaussian hills though, take a look at Multivariate kernel density estimation.

Added: There are zillions of functions that go smoothly between 0 and 1, but that doesn't make them probabilities of something.
"Probability" means either that chance, likelihood, is involved, as in probability of rain;
or that you're trying to impress somebody.

Added again: scholar.google.com "(single|1) nearest neighbor classifier" gets > 300 hits; "k nearest neighbor classifier" gets almost 3000.
It seems to me (non-expert) that, out of 10 different ways of mapping k-NN distances to labels,
each one might be better than the 9 others — for some data, with some error measure.
Anyway, you could try asking stats.stackexchange.com ,

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Many thanks belisarius and Denis for your suggestions. Can anybody comment on the calculation of'probability' that I proposed? –  WoA Feb 8 '11 at 16:57
Hello Denis, I can plot the contours of the kernel density estimate of my bivariate data using the "ks" package of R. But can somebody tell me how to classify or label one test point using the kernel density? Or is it just for visualization ? Is there any R/Perl module for doing such a classification? Thanks –  WoA Feb 10 '11 at 6:07
WoA, can you put up a plot like the "Old Faithful Geyser data kernel density estimate" from Wikipedia Multivariate_kernel_density_estimation ? Do the red / orange / yellow regions overlap ? –  denis Feb 10 '11 at 9:10

The Nearest Neighbour method is already using the Bayes theorem to estimate the probability using the points in a ball containing your chosen K points. There is no need to transform, as the number of points in the ball of K points belonging to each label divided by the total number of points in that ball already is an approximation of the posterior probability of that label. In other words:

P(label|z) = P(z|label)P(label) / P(z) = K(label)/K

This is obtained using the Bayes rule of probability on an estimated probability estimated using a subset of the data. In particular, using:

VP(x) = K/N (this gives you the probability of a point in a ball of volume V)

P(x) = K/NV (from above)

P(x=label) = K(label)/N(label)V (where K(label) and N(label) are the number of points in the ball of that given class and the number of points in the total samples of that class)

and

P(label) = N(label)/N.

Therefore, just pick a K, calculate the distances, count the points and by checking their labels and recounting you will have your probability.

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The answer is : it depends.

Imagine your labels are the surname of a person, and the X,Y coordinates represent some essential characteristics of the person's DNA sequence. Clearly a more close DNA description enhance the probability of having the same surnames.

Now suppose the X,Y is the lat/long of the work office for that person. Working closer isn't related to label (surname) sharing.

So, it depends on the semantic of your tags and axes.

HTH!

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