Wolfram Language™

Klassifizierung von Punkten aus verschiedenen Clustern

Verwenden Sie ein Netz, um Punkte aus drei konzentrischen Clusters zu unterscheiden.

Erstellen Sie einen künstlichen Datensatz aus drei konzentrischen Clusters.

In[1]:=

sampledata[sd_] := RandomVariate[MultinormalDistribution[{0, 0}, sd*IdentityMatrix[2]], 500]; clusters = Map[sampledata, {3, 1.5, 0.2}]; ListPlot[clusters, PlotStyle -> Map[Directive[#, PointSize[0.015]] &, {RGBColor[ 1, 0.21, 0.35000000000000003`], RGBColor[0.3, 0.78, 0.38], RGBColor[0.46, 0.5700000000000001, 1]}], Axes -> None, AspectRatio -> 1]

Out[1]=

Erzeugen Sie die Trainingssaten, indem Sie jeden Punkt mit einem Label assoziieren.

In[2]:=

trainingData = Join[Thread[clusters[[1]] -> Red], Thread[clusters[[2]] -> Green], Thread[clusters[[3]] -> Blue]]; RandomSample[trainingData, 8]

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Erzeuegen Sie ein Netz, um die Wahrscheinlichkeit zu berechnen, mit der ein Punkt in den drei Clustern liegt.

In[3]:=

net = NetChain[{30, Tanh, 20, Tanh, 3, SoftmaxLayer[]}, "Input" -> {2}, "Output" -> NetDecoder[{"Class", {Red, Green, Blue}}]]

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Trainieren Sie das Netz mit den Daten.

In[4]:=

trained = NetTrain[net, trainingData]

In[5]:=

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apfQTmGytwAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAAA QG7z/wFt4Sws "], {{0, 752}, {560, 0}}, {0, 255}, ColorFunction->RGBColor], BoxForm`ImageTag[ "Byte", ColorSpace -> "RGB", Interleaving -> True, Magnification -> 0.5], Selectable->False], DefaultBaseStyle->"ImageGraphics", ImageSize->Magnification[0.5], ImageSizeRaw->{560, 752}, PlotRange->{{0, 560}, {0, 752}}]\)

Sagen Sie die Wahrscheinlichkeiten vorher, mit denen Punkte entlang der x-Achse liegen.

In[6]:=

Show[Table[ Plot[trained[{x, 0}, {"Probability", col}], {x, -5, 5}, PlotStyle -> col], {col, {Blue, Green, Red}}], PlotRange -> All]

Out[6]=

Plotten Sie die Wahrscheinlichkeit jeder Klasse als den roten, grünen und blauen Farbkanal eines Bildes.

In[7]:=

row = Range[-4, 4, 0.05]; coords = Tuples[row, 2]; preds = Partition[trained[coords, None], Length[row]]; Image[Reverse@Transpose@preds]

Out[7]=

Plotten Sie die Wahrscheinlichkeitsdichte als eine Funktion der Position separat für jede Klasse.

In[8]:=

GraphicsRow@ Table[ContourPlot[ trained[{x, y}, {"Probability", col}], {x, -5, 5}, {y, -5, 5}, ColorFunction -> (Blend[{White, Darker[col]}, #] &), PlotRange -> All, ContourStyle -> None], {col, {Red, Green, Blue}}]

Out[8]=

Plotten Sie die Entropie der vorherigen Verteilung als eine Funktion der Position, um zu visualisieren, wo das Netz am unsichersten bei den Vorhersagen ist.

In[9]:=

row = Range[-5, 5, 0.05]; coords = Tuples[row, 2]; entropy = Partition[trained[coords, "Entropy"], Length[row]]; Image[Reverse@Transpose@entropy]

Out[9]=