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[[Category:2010 Spring ECE 662 mboutin]]
 
[[Category:2010 Spring ECE 662 mboutin]]
  
=Details of Lecture 22, [[ECE662]] Spring 2010=
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=Details of Lecture 22, [[ECE662]] Spring 2010, [[User:mboutin|Prof. Boutin]]=
In Lecture 22, we continued our discussion of Fisher's linear discriminant. We began by answering the question: why not use  
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In Lecture 22, we continued our discussion of [[Fisher Linear Discriminant|Fisher's linear discriminant]]. We began by answering the question: why not use  
  
 
<math>J(\vec{w})=\frac{\|  \tilde{m}_1-\tilde{m}_2\|^2}{\|\vec{w} \|^2}</math>  
 
<math>J(\vec{w})=\frac{\|  \tilde{m}_1-\tilde{m}_2\|^2}{\|\vec{w} \|^2}</math>  
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?
 
?
  
We then presented the analytic expression for <math>\vec{w}_0</math>, the argmax of <math>J(\vec{w})</math>, and related <math>\vec{w}_0</math> to the least square solution of <math>Y \vec{c}=b</math>. Finally, we began Section 9 of the course on Support Vector Machines by introducing the idea of extending the feature vector space into a space spanned by monomials.  
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We then presented the analytic expression for <math>\vec{w}_0</math>, the argmax of <math>J(\vec{w})</math>, and related <math>\vec{w}_0</math> to the least square solution of <math>Y \vec{c}=b</math>. We noted the relationship between [[Fisher Linear Discriminant|Fisher's linear discriminant]] and [[Feature Extraction|feature extraction]].
 
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Finally, we began Section 9 of the course on [[Support Vector Machines]] by introducing the idea of extending the feature vector space into a space spanned by monomials.  
==Useful Links==
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For more info, you may look at these students' pages on Fisher's linear discriminant:
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* [[Derivation_of_Fisher's_Linear_Discriminant_OldKiwi|Definition Fisher's linear discriminant]],
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* [[Fisher_Linear_Discriminant_OldKiwi| Fisher's linear discriminant in brief]]
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Previous: [[Lecture21ECE662S10|Lecture 21]]
 
Previous: [[Lecture21ECE662S10|Lecture 21]]

Latest revision as of 10:49, 13 April 2010


Details of Lecture 22, ECE662 Spring 2010, Prof. Boutin

In Lecture 22, we continued our discussion of Fisher's linear discriminant. We began by answering the question: why not use

$ J(\vec{w})=\frac{\| \tilde{m}_1-\tilde{m}_2\|^2}{\|\vec{w} \|^2} $ instead of $ J(\vec{w})=\frac{\| \tilde{m}_1-\tilde{m}_2 \|^2}{\tilde{s}_1^2+\tilde{s}_2^2} $ ?

We then presented the analytic expression for $ \vec{w}_0 $, the argmax of $ J(\vec{w}) $, and related $ \vec{w}_0 $ to the least square solution of $ Y \vec{c}=b $. We noted the relationship between Fisher's linear discriminant and feature extraction. Finally, we began Section 9 of the course on Support Vector Machines by introducing the idea of extending the feature vector space into a space spanned by monomials.

Previous: Lecture 21 Next: Lecture 23


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