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The video demonstrates Bayes decision rule on 2D feature data from two classes. We visualize the decision hyper surface as a red "wall" cutting through the bi-modal distribution of the data, and observe how it changes with the parameters of the Gaussian distributions for the two classes.  Note that if the covariance matrices and the priors of the classes are identical, then the decision surface cuts directly between the two modes.  If the prior of one class increases, the decision surface is "pushed away" from that mode, biasing the classifier in favor of the more likely class.
 
The video demonstrates Bayes decision rule on 2D feature data from two classes. We visualize the decision hyper surface as a red "wall" cutting through the bi-modal distribution of the data, and observe how it changes with the parameters of the Gaussian distributions for the two classes.  Note that if the covariance matrices and the priors of the classes are identical, then the decision surface cuts directly between the two modes.  If the prior of one class increases, the decision surface is "pushed away" from that mode, biasing the classifier in favor of the more likely class.
  
The code for making such a video is here:
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The code for making such a video is [http://web.ics.purdue.edu/~huffmalm/BayesDecisionSurface.tar.gz available for download here]
[[Media:BayesDecisionSurface.tar.gz_OldKiwi]]
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For more on Bayes' decision rule, see [[Lecture 6_OldKiwi]]
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For more on Bayes' decision rule, see [[Lecture_6_-_Discriminant_Functions_OldKiwi]]

Latest revision as of 10:06, 10 April 2008

BayesYouTubeLink OldKiwi.jpg

Note: The above image is NOT a link. Please click here for link to video.

The video demonstrates Bayes decision rule on 2D feature data from two classes. We visualize the decision hyper surface as a red "wall" cutting through the bi-modal distribution of the data, and observe how it changes with the parameters of the Gaussian distributions for the two classes. Note that if the covariance matrices and the priors of the classes are identical, then the decision surface cuts directly between the two modes. If the prior of one class increases, the decision surface is "pushed away" from that mode, biasing the classifier in favor of the more likely class.

The code for making such a video is available for download here

For more on Bayes' decision rule, see Lecture_6_-_Discriminant_Functions_OldKiwi

Alumni Liaison

Abstract algebra continues the conceptual developments of linear algebra, on an even grander scale.

Dr. Paul Garrett