How do I determine k when using k-means clustering?

I've been studying about k-means clustering, and one thing that's not clear is how you choose the value of k. Is it just a matter of trial and error, or is there more to it?

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Ah ah... That's really the question (about k-mean). –  mjv Nov 24 '09 at 23:00
can you share the code for the function L (log likelihood)? Given a center at X,Y and points at (x(i=1,2,3,4,...,n),y(i=1,2,3,4,..,n)), how do I get L? –  user653773 Mar 10 '11 at 15:09
a link to Wikipedia article on the subject: en.wikipedia.org/wiki/… –  Amro Jul 11 '11 at 23:28
I've answered a similar Q with half a dozen methods (using R) over here: stackoverflow.com/a/15376462/1036500 –  Ben May 13 '13 at 4:52

You can maximize the Bayesian Information Criterion (BIC):

BIC(C | X) = L(X | C) - (p / 2) * log n

where L(X | C) is the log-likelihood of the dataset X according to model C, p is the number of parameters in the model C, and n is the number of points in the dataset. See "X-means: extending K-means with efficient estimation of the number of clusters" by Dan Pelleg and Andrew Moore in ICML 2000.

Another approach is to start with a large value for k and keep removing centroids (reducing k) until it no longer reduces the description length. See "MDL principle for robust vector quantisation" by Horst Bischof, Ales Leonardis, and Alexander Selb in Pattern Analysis and Applications vol. 2, p. 59-72, 1999.

Finally, you can start with one cluster, then keep splitting clusters until the points assigned to each cluster have a Gaussian distribution. In "Learning the k in k-means" (NIPS 2003), Greg Hamerly and Charles Elkan show some evidence that this works better than BIC, and that BIC does not penalize the model's complexity strongly enough.

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Great answer! For X-Means, do you know if overall BIC score n := k*2 (k clusters, each cluster modeled by Gaussian with mean/variance parameters). Also if you determine the "parent" BIC > "2 children" BIC would you ever split that cluster again in the next iteration? –  Budric Jul 14 '11 at 22:04
@Budric, these should probably be separate questions, and maybe on stats.stackexchange.com. –  Vebjorn Ljosa Jul 15 '11 at 0:05

Basically, you want to find a balance between two variables: the number of clusters (k) and the average variance of the clusters. You want to minimize the former while also minimizing the latter. Of course, as the number of clusters increases, the average variance decreases (up to the trivial case of k=n and variance=0).

As always in data analysis, there is no one true approach that works better than all others in all cases. In the end, you have to use your own best judgement. For that, it helps to plot the number of clusters against the average variance (which assumes that you have already run the algorithm for several values of k). Then you can use the number of clusters at the knee of the curve.

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For k-mean you might want to have a look at gap statistic

http://blog.echen.me/2011/03/19/counting-clusters/

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Yes, you can find the best number of clusters using Elbow method, but I found it troublesome to find the value of clusters from elbow graph using script. You can observe the elbow graph and find the elbow point yourself, but it was lot of work finding it from script.

So another option is to use Silhouette Method to find it. The result from Silhouette completely comply with result from Elbow method in R.

Here`s what I did.

#Dataset for Clustering
n = 150
g = 6
set.seed(g)
d <- data.frame(x = unlist(lapply(1:g, function(i) rnorm(n/g, runif(1)*i^2))),
y = unlist(lapply(1:g, function(i) rnorm(n/g, runif(1)*i^2))))
mydata<-d
#Plot 3X2 plots
attach(mtcars)
par(mfrow=c(3,2))

#Plot the original dataset
plot(mydata\$x,mydata\$y,main="Original Dataset")

#Scree plot to deterine the number of clusters
wss <- (nrow(mydata)-1)*sum(apply(mydata,2,var))
for (i in 2:15) {
wss[i] <- sum(kmeans(mydata,centers=i)\$withinss)
}
plot(1:15, wss, type="b", xlab="Number of Clusters",ylab="Within groups sum of squares")

# Ward Hierarchical Clustering
d <- dist(mydata, method = "euclidean") # distance matrix
fit <- hclust(d, method="ward")
plot(fit) # display dendogram
groups <- cutree(fit, k=5) # cut tree into 5 clusters
# draw dendogram with red borders around the 5 clusters
rect.hclust(fit, k=5, border="red")

#Silhouette analysis for determining the number of clusters
library(fpc)
asw <- numeric(20)
for (k in 2:20)
asw[[k]] <- pam(mydata, k) \$ silinfo \$ avg.width
k.best <- which.max(asw)

cat("silhouette-optimal number of clusters:", k.best, "\n")
plot(pam(d, k.best))

# K-Means Cluster Analysis
fit <- kmeans(mydata,k.best)
mydata
# get cluster means
aggregate(mydata,by=list(fit\$cluster),FUN=mean)
# append cluster assignment
mydata <- data.frame(mydata, clusterid=fit\$cluster)
plot(mydata\$x,mydata\$y, col = fit\$cluster, main="K-means Clustering results")

Hope it helps!!

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First build a minimum spanning tree of your data. Removing the K-1 most expensive edges splits the tree into K clusters,
so you can build the MST once, look at cluster spacings / metrics for various K, and take the knee of the curve.

This works only for Single-linkage_clustering, but for that it's fast and easy. Plus, MSTs make good visuals.
See for example the MST plot under stats.stackexchange visualization software for clustering.

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Look at this paper. It uses a Gaussian test to determine the right number of clusters. Also, the authors claim that this method is better than BIC which is mentioned in the accepted answer.

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