# Given a 2D array of numbers, find clusters

Given a 2D array, for example:

``````0 0 0 0 0
0 2 3 0 1
0 8 5 0 7
7 0 0 0 4
``````

Output should be groups of clusters:

Cluster 1: `<2,3,8,5,7>`

Cluster 2: `<1,7,4>`

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There are zeros in big cluster. How many zeros is sub-matrix allowed to have for it to be still considered a cluster? –  Dialecticus Dec 29 '11 at 11:24
If this was asked in an interview, the interviewer wanted a variant of the flood fill algorithm –  Satadru Biswas Feb 20 '12 at 17:20

One way to do it is with a graph. Traverse the matrix in some order (I'd go left to right, top to bottom). When you encounter a non-zero element, add it to the graph. Then check all of its neighbors (it looks like you want 8-connected neighbors), and for each one that is non-zero, add its node to the graph, and connect it to the current element. The elements in the graph will probably have to keep track of their coordinates so you can see if you're adding a duplicate or not. When you're done traversing the matrix, you have a graph which contains a set of clusters. Clusters should be sub-graphs of connected elements.

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Your problem seems to be finding connected components. You should use a traverse method (either BFS or DFS will do the work). Iterate over all elements, for each non-zero element start a traverse and record all elements you see in that traverse and turn each visited element into zero. Something like the code below:

``````void DFS(int x, int y)
{
printf("%d ", g[x][y]);
g[x][y] = 0;
// iterate over neighbours
for(dx=-1; dx<=1; dx++)
for(dy=-1; dy<=1; dy++)
if (g[x+dx][y+dy]) DFS(x+dx, y+dy);
}

for(i=0; i<n; i++)
for(j=0; j<n; j++)
if (g[i][j])
{
DFS(i, j);
printf("\n");
}
``````
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If you know the number of groups or want to fit your data to a static number of groups, you can do k-means.

http://en.wikipedia.org/wiki/K-means_clustering

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You want to do Connected Component Labeling. This is usually considered an image processing algorithm, but it matches what you describe.

You will also get recommendations of K-means because you said 2D array of numbers and it is easy to interpret that as array of 2D numbers. K-means finds clusters of points in a plane, not connected groups in a 2D array like you request.

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