This example shows how to adjust the amount of fuzzy overlap when performing fuzzy c-means clustering.
Create a random data set. For reproducibility, initialize the random number generator to its default value.
rng('default') data = rand(100,2);
Specify fuzzy partition matrix exponents.
M = [1.1 2.0 3.0 4.0];
The exponent values in
M must be greater than
1, with smaller values specifying a lower degree of fuzzy overlap. In other words, as
1, the boundaries between the clusters become more crisp.
For each overlap exponent:
Cluster the data.
Classify each data point into the cluster for which it has the highest degree of membership.
Find the data points with maximum membership values below
0.6. These points have a more fuzzy classification.
To quantify the degree of fuzzy overlap, calculate the average maximum membership value across all data points. A higher average maximum membership value indicates that there is less fuzzy overlap.
Plot the clustering results.
for i = 1:4 % Cluster the data. options = [M(i) NaN NaN 0]; [centers,U] = fcm(data,2,options); % Classify the data points. maxU = max(U); index1 = find(U(1,:) == maxU); index2 = find(U(2,:) == maxU); % Find data points with lower maximum membership values. index3 = find(maxU < 0.6); % Calculate the average maximum membership value. averageMax = mean(maxU); % Plot the results. subplot(2,2,i) plot(data(index1,1),data(index1,2),'ob') hold on plot(data(index2,1),data(index2,2),'or') plot(data(index3,1),data(index3,2),'xk','LineWidth',2) plot(centers(1,1),centers(1,2),'xb','MarkerSize',15,'LineWidth',3) plot(centers(2,1),centers(2,2),'xr','MarkerSize',15,'LineWidth',3) hold off title(['M = ' num2str(M(i)) ', Ave. Max. = ' num2str(averageMax,3)]) end
A given data point is classified into the cluster for which it has the highest membership value, as indicated by
maxU. A maximum membership value of
0.5 indicates that the point belongs to both clusters equally. The data points marked with a black x have maximum membership values below
0.6. These points have a greater degree of uncertainty in their cluster membership.
More data points with low maximum membership values indicate a greater degree of fuzzy overlap in the clustering result. The average maximum membership value,
averageMax, provides a quantitative description of the overlap. An
averageMax value of
1 indicates crisp clusters, with smaller values indicating more overlap.