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)
|
Lemma 1: Entropy is greater than or equal to zero
-
|
|
(5)
|
Proof: Since , then , and subsequently, . Thus from Eq. (4) we get .
Lemma 2: Changing the logarithm base
-
|
|
(6)
|
Proof:
- Given that
- And since
- We get
Note that the entropy, , has units of bits for , or nats (natural units) for , or dits (decimal digits) for .
Joint Entropy