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*Write comment/question here
 
*Write comment/question here
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This slecture is nicely organized from introduction to decision making based on Parzen windows.
 
This slecture is nicely organized from introduction to decision making based on Parzen windows.
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I have just a little suggestions about your slecture.  
 
I have just a little suggestions about your slecture.  
It was not very clear how <math> h_j->0</math> results in <math>\frac{1}{V_j}\phi(\frac{x_l_x_0}{h_j})->\delta(x-x_0) </math>
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It was not very clear how <math> h_j \longrightarrow0</math> results in<math> \frac{1}{V_j} \phi(\frac{x_l - x_0}{h_j}) = \delta_j(x_j - x_0) \longrightarrow \delta(x - x_0) </math>.
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In addition, it would have been better if there was appropriate labels for each figure (x-axis was not very clear). Because the idea was on n dimensional while figures were 2D, figures were a little confusing.   
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If you would like to make the slecture even better, my suggestion is to include some graphs verifying the effects of smaller h or larger training data sets on  density estimation and decision making based on Parzen windows method.
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But, overall, this slecture is an excellent source to understand basic concepts of Parzen windows.          [Reviewd by Jieun Kim]
  
 
**answer here
 
**answer here
 
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[[ Parzen Windows | Back to Parzen Windows]]
 
[[ Parzen Windows | Back to Parzen Windows]]

Latest revision as of 17:32, 6 May 2014

Comments for Parzen Windows

A slecture by Abdullah Alshaibani


Please leave me comment below if you have any questions, if you notice any errors or if you would like to discuss a topic further.




  • Write comment/question here


This slecture is nicely organized from introduction to decision making based on Parzen windows. The slecture contains some important points from the class along with figures to help us understand better about window functions.

I have just a little suggestions about your slecture.

It was not very clear how $ h_j \longrightarrow0 $ results in$ \frac{1}{V_j} \phi(\frac{x_l - x_0}{h_j}) = \delta_j(x_j - x_0) \longrightarrow \delta(x - x_0) $.

In addition, it would have been better if there was appropriate labels for each figure (x-axis was not very clear). Because the idea was on n dimensional while figures were 2D, figures were a little confusing.

If you would like to make the slecture even better, my suggestion is to include some graphs verifying the effects of smaller h or larger training data sets on density estimation and decision making based on Parzen windows method.

But, overall, this slecture is an excellent source to understand basic concepts of Parzen windows. [Reviewd by Jieun Kim]

    • answer here

Back to Parzen Windows

Alumni Liaison

Sees the importance of signal filtering in medical imaging

Dhruv Lamba, BSEE2010