I'm experimenting with an idea, where I have following subproblem:

I have a list of size `m`

containing tuples of fixed length `n`

.

```
[(e11, e12, .., e1n), (e21, e22, .., e2n), ..., (em1, em2, .., emn)]
```

Now, given some random tuple `(t1, t2, .., tn)`

, which does not belong to the list, I want to find the closest tuple(s), that belongs to the list.

I use the following distance function (Hamming distance):

```
def distance(A, B):
total = 0
for e1, e2 in zip(A, B):
total += e1 == e2
return total
```

One option is to use exhaustive search, but this is not sufficient for my problem as the lists are quite large. Other idea, I have come up with, is to first use `kmedoids`

to cluster the list and retrieve `K`

medoids (cluster centers). For querying, I can determine the closest cluster with `K`

calls to distance function. Then, I can search for the closest tuple from that particular cluster. I think it should work, but I am not completely sure, if it is fine in cases the query tuple is on the edges of the clusters.

However, I was wondering, if you have a better idea to solve the problem as my mind is completely blank at the moment. However, I have a strong feeling that there may be a clever way to do it.

Solutions that require precomputing something are fine as long as they bring down the complexity of the query.