Difference between revisions of "Entropy, Relative Entropy, Mutual Information"

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== Entropy ==
 
== Entropy ==
 +
Definitions:
 +
* a measure of the uncertainty of a random variable
 +
* The entropy of a random variable is a measure of the uncertainty of the random variable
 +
** it is a measure of the amount of information required on the average to describe the random variable
 +
 
The entropy of a discrete random variable, <math>X</math>, is
 
The entropy of a discrete random variable, <math>X</math>, is
  

Revision as of 16:11, 25 June 2020

Definitions

Entropy

  • a measure of the uncertainty of a random variable
  • The entropy of a random variable is a measure of the uncertainty of the random variable
    • it is a measure of the amount of information required on the average to describe the random variable

Relative Entropy

  • a measure of the distance between two distributions
  • a measure of the inefficiency of assuming that the distribution is when the true distribution is .

Mutual Information

  • a measure of the amount of information that one random variable contains about another random variable

Entropy

Definitions:

  • a measure of the uncertainty of a random variable
  • The entropy of a random variable is a measure of the uncertainty of the random variable
    • it is a measure of the amount of information required on the average to describe the random variable

The entropy of a discrete random variable, , is

 

 

 

 

(1)

where has a probability mass function (pmf), , and an alphabet .

Expected Value

For a discrete random variable, , with probability mass function, , the expected value of is

 

 

 

 

(2)

For a discrete random variable, , with probability mass function, , the expected value of is

 

 

 

 

(3)

Consider the case where . We get

 

 

 

 

(4)