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# Using Bhattacharyya Distance for feature selection

I have a set of 240 features extracted using Image Processing. The objective is to classify test cases into 7 different classes after training. For each class there are about 60 observations(viz, I have around 60 feature vectors for each class with each vector having 240 components).

Many research papers and books make use of the Sequential Forward Search or Sequential Backward search for selection of the best features from a feature vector. The following picture gives a sequential forward search algorithm.

Any such algorithm uses some criterion to discriminate between features. A common method is to use the Bhattacharyya Distance as a criterion. The Bhattacharyya Distance is a divergence type measure between distributions. On some research and study I found that given a matrix M1 for a class A consisting of all the 60 feature vectors of this class such that it has n=60 rows and m=240 columns (since there are a total of 240 features) and a similar matrix M2 for a class B I can find out the Bhattacharyya Distance between them and find their interdependence.

My question is how do I integrate the two. How do I include the Bhattacharyya Distance as a criterion for selecting the best features in the algorithm as described above.

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With help from Arthur B. I finally understood the concept. Here is my implementation of it. Although I used the Plus l Take away r algorithm (Sequential Forwards Backward Search) Ill post that as it is basically the same once the Backward Search is removed. The below implementation is in matlab but very simple to understand:

S=zeros(Size,1); %Initial the binary array feature list with all zeros implying no feature selected
k=0;
while k<n  %Begin SFS. n is the number of features that need to be extracted
t=k+l;     %l is the number of features to be added in each iteration
while k<t
R=zeros(Size,1);  %Size is the total number of features
for i=1:Size
if S(i)==0    %If the feature has not been selected. S is a binary array which puts a one against each feature that is selected
S_copy=S;
S_copy(i)=1;
R=OperateBhattacharrya(Matrices,S_copy,i,e,R);  %The result of each iteration is stored in R
end
end
k=k+1;   %increment k
[~,N]=max(R);  %take the index of the maximum element in R as the best feature to be selected
S(N)=1;        % put the index of selected feature as 1
end
t=k-r;    %r is the number of features to be removed after selecting l features. l>r
while k>t  %start Sequential Backward Search
R=zeros(Size,1);
for i=1:Size
if S(i)==1
S_copy=S;
S_copy(i)=0;
R=OperateBhattacharrya(Matrices,S_copy,i,1,R);
end
end
k=k-1;
[~,N]=max(R);
S(N)=0;
end
fprintf('Iteration :%d--%d\n',k,t);
end

I hope this helps anyone who has a similar problem.

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Is there any code for OperateBhattacharrya function? – Matthieu Apr 18 '15 at 20:59
@Matthieu There would have been. This was a research project close to two years ago. – Sohaib Apr 19 '15 at 10:26

That's the "evaluate the branch" part of the algorithm, except you'll first use this Bhattacharyya distance on one dimensional vectors, then two dimensional vectors, etc.

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Can u elaborate a little if I explain my whole problem? – Sohaib Oct 31 '13 at 15:13
Feel free to add more details. SFS is a very simple greedy approach to selecting features. – Arthur B. Oct 31 '13 at 15:21
Umm actually read the first paragraph of my question I had added the details. Acc. to my understanding Bhattcharyya Distance finds the distance between two classes for example the rows of a matrix represent the number of observations and the columns represent each feature so in my case its like a 60x240 matrix. Am I right? – Sohaib Oct 31 '13 at 15:27
To find the best feature in the set, you'll use a 60x1 matrix. Then to find the second best, a 60x2 matrix... etc. – Arthur B. Oct 31 '13 at 15:35
So I find the distance of class 1 to the other 6 classes add them up. Then of class 2 and add them up and so on. Finally the 7th class with all other classes. Whichever class has the highest distance It would make it the best? Wouldn't that be too complex? – Sohaib Oct 31 '13 at 15:38