The question is about KNN algorithm for classification - the class labels of training samples are discrete.

Suppose that the training set has `n`

points that are identical to the new pattern which we are about to classify, that is the distances from these points to new observation are zero (or `<epsilon`

). It may happen that these identical training points have different class labels. Now suppose that `n < K`

and there are some other training points which are the part of nearest neighbors collection but have non-zero distances to the new observation. How do we assign the class label to new point in this case?

There are few possibilities such as:

- consider all K (or more if there are ties with the worst nearest neighbor) neighbors and do majority voting
- ignore the neighbors with non-zero distances if there are "clones" of the new point in training data and take the majority vote only over the clones
- same as 2. but assign the class with the highest prior probability in the training data (among clones)
- ...

Any ideas? (references would be appreciated as well)