# when will KD tree search for KNN not work?

I've been exploring and learning about KD Trees for KNN (K Nearest Neighbors problem) when would the search not work? or would be worth or not improve the naive search. are there any drawbacks of this approach?

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It depends on your distance function.

You can't use k-d-trees with arbitrary distance functions. Minkowski norms should be fine though. But in a lot of applications, you will want to use more advanced distance functions.

Plus, with increasing dimensionality, k-d-trees work much less good.

The reason is simple: k-d-trees avoid looking at points where the one-dimensional distance to the boundary is already larger than the desired theshold, i.e. where for Euclidean distances (where z is the neares border, y the closes known point):

(x_j - z_j)      <=>   sqrt(sum_i((x_i - y_i)^2))
equivalently, but cheaper:
(x_j - z_j)^2    <=>   sum_i((x_i - y_i)^2)

You can imagine that the chance of this purning rule holding decrease drastically with the number of dimensions. If you have 100 dimensions, there is next to no chance that a single dimensions squared difference will be larger than the sum of squared differences.

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