# Clustering 2D plot in Mathematica

``````laListe={{{{10, 17}, 1}, {{33, 12}, 1}, {{32, 17}, 1}, {{9, 10},1},
{{22, 24}, 1},{{27, 6}, 2}, {{25, 13}, 2}, {{30, 9}, 2}},
{{{14, 12}, 1},{{19, 17}, 1}, {{7, 21}, 1}, {{7, 24},1},
{{27, 19}, 1}, {{12, 16}, 2}, {{13, 20}, 2}, {{20, 22}, 2}}}

FrameXYs = {{4.32, 3.23}, {35.68, 26.75}}

Row[Function[compNo,
Graphics[{White, EdgeForm[Thick],
Rectangle @@ FrameXYs,
Black,
Disk[Sequence @@ laListe[[compNo, #]]] & /@
Range[Length@laListe[[compNo]]]}, ImageSize -> 300]] /@
{1, 2}]
``````

I would like to find a way to cluster those disk given their proximity to each other. Does Mathematica have built in feature to do such thing ?

EDIT

As I tried FindClusters I yet encounter several inconvenience :

With :

``````list1={{{24.413, 6.5978}, {7.68887, 7.2147}, {29.357, 13.2822},
{6.22436, 9.7145}, {22.7162, 17.7198}, {13.6851, 5.7635},
{18.8062, 12.9946}, {8.04889, 16.7414}}}
``````

Does FindClusters dislkike Decimals :

``````FindClusters[Flatten[list1,1]]
``````

Out :

``````  {{{{24.413, 6.5978}, {7.68887, 7.2147}, {29.357, 13.2822},
{6.22436,9.7145}, {22.7162, 17.7198}, {13.6851, 5.7635},
{18.8062,12.9946}, {8.04889, 16.7414}}}}
``````

Whereas :

``````  FindClusters[Flatten[Round[list1], 1]]
``````

Out :

``````   {{{24, 7}, {29, 13}, {23, 18}, {14, 6}, {19, 13}},
{{8, 7}, {6, 10}, {8, 17}}}
``````

Then, to do this I had to get rid of the Disks Diameter which is important to me as visual cluster. Then I would like to capture alignment. When 5 disks are not grouped but aligned. And as I tested it on a few composition it does not find those as such.

On thing I am trying is tho "Pointize" the disks using the following :

``````pointize[{{x_,y_},r_},size_:12] :=
Table[{x+r Cos[i ((2\[Pi])/size)],
y+r Sin[i ((2\[Pi])/size)]},{i,0,size}]
``````

I used that initially to compute ConvexHullArea of those disks. I feel it could help my need of taking into accound the radius, but the implementation is tricky and I am not even sure if it is relevant

Also, I hope it was only the decimals issue, but I could not use FindClusters[list] as such but had to give it the number of cluster I want FindClusters[list,3], whereas what I want is to have the same algorithm that can find different cluster number on different composition.

Would you think of particular settings &/or distance function to do so with FindClusters?

EDIT

I found something interesting thanks to previous tricks learned thanks to experts here. Just an idea, I need to fin a way quantify that and put the new image in a matrix form or so to use .

``````comp1 = Graphics[{White, Rectangle @@ FrameXYs, Black,
Disk[Sequence @@ laListe[[1, #]]] & /@ Range[Length@laListe[[1]]]},
ImageSize -> 300]
``````

``````     Binarize[ImageCorrelate[comp1, GaussianMatrix[40]], .95]
``````

-
See my answer here stackoverflow.com/questions/3165867/… –  belisarius Sep 4 '11 at 3:56
I don't see why you had to get rid of the bubble diameter - it is effectively your third dimension, isn't it? Also you don't have to specify the number of clusters to find. Your latest edit with the Gaussian blobs is cool, but I think it's a separate question. –  Verbeia Sep 5 '11 at 0:16
Verbeia, I guess I am not agile with find clusters, I thought I could not have my third dimension (radius) in it, I will try harder. –  500 Sep 5 '11 at 1:37

Yes, FindClusters should do what you want. There is a tutorial. You might have to flatten the data to be an `n` times 3 matrix.

-

Alternatively, you could use something like:

``````Table[Colorize[
MorphologicalComponents[Blur[ColorNegate@comp1, i], .05]], {i, 1, 60, 10}]
``````

You may also use `Dilation`, depending upon what kind of regions you want as a result

``````Table[Colorize@
MorphologicalComponents@Dilation[ColorNegate@comp1, DiskMatrix@i], {i,1,60,10}]
``````

BTW, here you have a way to use `FindClusters`, not very efficient and probably with non-intuitive results:

``````ImageRotate[Rasterize[
Show[
ListPlot@
FindClusters[Position[ImageData@Binarize@ColorNegate@comp1, 1, {2}], 3],
Axes -> False, AspectRatio -> Automatic]], 3 Pi/2]
``````

Edit

Probably you can manage the `FindClusters` options to get better results. For example:

``````ImageRotate[Rasterize[Show[
ListPlot@
FindClusters[
Position[ImageData@Binarize@Rasterize[ColorNegate@comp1, RasterSize -> 200],
1, {2}],
3, Method -> {"Agglomerate", "Linkage" -> "Complete"}],
Axes -> False, AspectRatio -> Automatic]], 3 Pi/2]
``````

And from here, you may also go to the Convex Hull:

``````<< ComputationalGeometry`
fc = FindClusters[
Position[
ImageData@Binarize@
Rasterize[ColorNegate@comp1, RasterSize -> 200],
1, {2}],
3, Method -> {"Agglomerate", "Linkage" -> "Complete"}];
ImageRotate[Graphics[Polygon@(#[[ConvexHull[#]]]) & /@ fc, Frame->True], 3 Pi/2]
``````

-
Thank you very much belisarius ! The last one is exactly what I am computing. Like Mr.Wizard & Yoda, I have no idea what you are doing, but it is magical at each time ! –  500 Sep 6 '11 at 1:36
+1 for an awesome complete implementation using so many diverse parts of the underlying Mathematica system. –  Verbeia Sep 7 '11 at 0:57
@Verbeia That is exactly why I find Mma so fun to use –  belisarius Sep 7 '11 at 1:14