(ML Estimation Rule)
(ML Estimation Rule)
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==ML Estimation Rule==
 
==ML Estimation Rule==
<math>\hat a_{ML} = \text{max}_a ( f_{X}(x_i;a) )</math>
+
<math>\hat a_{ML} = \text{max}_a ( f_{X}(x_i;a) \text{For continuous} )</math>
 +
 
 +
<math>\hat a_{ML} = \text{max}_a ( Pr(x_i;a) \text{For discrete} )</math>
  
 
==MAP Estimation Rule==
 
==MAP Estimation Rule==

Revision as of 16:22, 18 November 2008

Covariance

  • $ COV(X,Y)=E[(X-E[X])(Y-E[Y])]\! $
  • $ COV(X,Y)=E[XY]-E[X]E[Y]\! $

Correlation Coefficient

$ \rho(X,Y)= \frac {cov(X,Y)}{\sqrt{var(X)} \sqrt{var(Y)}} \, $

Markov Inequality

Loosely speaking: In a nonnegative RV has a small mean, then the probability that it takes a large value must also be small.

  • $ P(X \geq a) \leq E[X]/a\! $

for all a > 0

Chebyshev Inequality

"Any RV is likely to be close to its mean"

$ \Pr(\left|X-E[X]\right|\geq C)\leq\frac{var(X)}{C^2}. $

ML Estimation Rule

$ \hat a_{ML} = \text{max}_a ( f_{X}(x_i;a) \text{For continuous} ) $

$ \hat a_{ML} = \text{max}_a ( Pr(x_i;a) \text{For discrete} ) $

MAP Estimation Rule

Bias of an Estimator, and Unbiased estimators

Confidence Intervals, and how to get them via Chebyshev

Alumni Liaison

has a message for current ECE438 students.

Sean Hu, ECE PhD 2009