I am running k-means clustering on ~1 million items (each represented as a ~100-feature vector). I have run the clustering for various k, and now want to evaluate the different results with the silhouette score implemented in sklearn. Attempting to run it with no sampling seems unfeasible and takes a prohibitively long time, so I assume I need to use sampling, i.e.:

```
metrics.silhouette_score(feature_matrix, cluster_labels, metric='euclidean',sample_size=???)
```

I don't have a good sense of what an appropriate sampling approach is, however. Is there a rule of thumb for what size sample to use given the size of my matrix? Is it better to take the largest sample my analysis machine can handle, or to take the average of more smaller samples?

I ask in large part because my preliminary test (with sample_size=10000) has produced some really really unintuitive results.

I'm also open to alternative, more scalable evaluation metrics.

Editing to visualize the issue: The plot shows, for varying sample sizes, the silhouette score as a function of the number of clusters

What's not weird is that increasing sample size seems to reduce noise. What is weird, given that I have 1 million, very heterogenous vectors, that 2 or 3 is the "best" number of clusters. In other words, what's unintuitive is that I would find a more-or-less monotonic decreases in silhouette score as I increase the number of clusters.

`sklearn.metrics.silhouette_score`

decreased monotonically, and I don't figure out why this happened`silhouette score`

with`SDbw`

, which was demonstrated to be the most robust index in this paper2more comments