Hello,
I understand you are trying to find the equations of the margins and separating hyperplanes for the SVM classifier, and you are using a ‘gaussian’ kernel. I also understand that the final objective here is to check whether a new sample point lies within the margin of separating hyperplane or not.
It is in fact a difficult task to obtain the equations of the separating hyperplane and margins, because the output of “fitcsvm” function will not have the beta values for a non-linear kernel like ‘gaussian’.
Alternatively, you could use “margin” function to compute the classification margins for each new sample and compare it to the max-margin of support vectors to filter out samples lying within the margin as shown in the code below:
labels = predict(cl,data_new);
m = margin(cl,data_new,labels);
maxMargin = max(margin(cl,cl.SupportVectors,cl.SupportVectorLabels));
indices = find(m < maxmargin);
figure;
h(1:2) = gscatter(data3(:,1),data3(:,2),theclass,'rb','.'); hold on
ezpolar(@(x)1); ezpolar(@(x)2);
h(3) = plot(data3(cl.IsSupportVector,1),data3(cl.IsSupportVector,2),'ko'); hold on
% PLOTTING NEW SAMPLES WITHIN THE 'MARGIN'
gscatter(data_new(indices,1),data_new(indices,2),labels(indices),'cm','.',20);
contour(x1Grid,x2Grid,reshape(scores(:,2),size(x1Grid)),[0 0],'k');
legend off;
axis equal
ylim([-2.5,2.5]); xlim([-2.5,2.5]);
hold off;
In the image below, I’ve plotted samples lying inside and outside the margins in separate figures.
- The green dots in Figure 21 represents new samples.
- In Figure 23, only new samples lying outside the margin is plotted (samples in cyan and magenta)
- In Figure 22, only new samples lying inside the margin is plotted.
You can clearly observe that “margin” function is proving helpful in this task.
I hope this helps.
