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I'm looking to create clusters around all 1s and 0s. Similar to Mindsweeper, I want to basically "draw a circle" around all 1s, and create a border where 0s exist.

I have tried using hclust() and creating a distance matrix, but the actual table I am working with is very large, and I have run into problems with run time.

test_matrix  <- matrix(c( 1,1,0,0,0,0,1,     
                          1,1,1,0,0,1,0,
                          0,1,0,0,0,1,0,
                          0,0,0,1,1,1,0,
                          0,0,0,1,1,1,1),nrow=5)

Result looks like this:

     [,1] [,2] [,3] [,4] [,5] [,6] [,7]
[1,]    1    0    0    1    0    1    0
[2,]    1    1    0    0    0    1    1
[3,]    0    1    1    0    0    0    1
[4,]    0    1    0    0    0    0    1
[5,]    0    1    0    1    1    0    1

My rules are as follows: If any 1 is connected to any 1 via UP, DOWN, LEFT, RIGHT, DIAGONAL(any direction), continue growing the "cluster". Based on these rules (8 points of connection for every point), I can spot four unique clusters with isolated 1s.

How would you code to find these groups?

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  • 4
    Please clarify your desired result. I.e. what is the link between "Result looks like this" and 'test_matrix'? Anyway, according to the description in your final section, it sounds like you are looking for library(raster); clump(raster(m)). If so, related: Extract sub-matrices from binary matrix in R – Henrik Jun 28 '19 at 7:52
  • 1
    Could indicate whether below answer did solve your problem? – Jaap Jul 4 '19 at 6:16
  • Could reply to comment asking for clarification and providing a potential solution? – Henrik Jul 4 '19 at 7:04
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+50

I think clustering is the right approach here, but you choose a poor ( computationally expensive) method for the task. I would go for DBSCAN like this:

library(dbscan)

## slightly altered test matrix to include a "cluster" with a single 1
test_matrix  <- matrix(c( 1,1,0,0,0,0,1,     
                          1,1,1,0,0,1,0,
                          0,1,0,0,0,1,0,
                          0,0,0,1,1,1,0,
                          1,0,0,1,1,1,1),
                          nrow=5, byrow = TRUE)

## find rows and columns of 1s
ones_pos <- which(test_matrix > 0,arr.ind=TRUE)


## perform DBSCAN clustering
## setting eps = sqrt(2) + .1 corresponds to your neighbourhood definition
## setting minPts = 2 will mark clusters of one point as noise
clust <- dbscan(ones_pos, eps = sqrt(2), minPts = 2)

## find the indices of noise elements
singular_ones <- ones_pos[clust$cluster == 0, ]

singular_ones
#> row col 
#>  5   1 

To find all clusters (including those that just consist of one 1) just set minPts to 1. In this case there can be no noise. The cluster membership is stored in clust$cluster.

I am quite certain this approach will also be quite fast with large matrices.

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    Made an edit removing the usage of dplyr which is way unnecessary in this case. – nicola Jun 28 '19 at 9:49
  • That makes a lot of sense! Thanks! Does this work if I want to look for all clusters, some with just one point? Others with many? All in the same test? – Kyle Jun 28 '19 at 17:17
  • This finds all clusters. Each cluster with more than minPts 1s gets assigned a number >=1. All other 1s get assigned 0 in clust$cluster – AEF Jun 29 '19 at 13:28

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