Entropy, Relative Entropy, Mutual Information

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

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

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

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, $X$ , is

H\left(X\right)=-\sum _{x\in {\mathcal {X}}}p\left(x\right)\cdot \log _{2}p\left(x\right)

(1)

where $X$ has a probability mass function (pmf), $p\left(x\right)$ , and an alphabet ${\mathcal {X}}$ .

For a discrete random variable, $X$ , with probability mass function, $p\left(x\right)$ , the expected value of $X$ is

E\left[X\right]=\sum _{x\in {\mathcal {X}}}x\cdot p\left(x\right)

(2)

For a discrete random variable, $X$ , with probability mass function, $p\left(x\right)$ , the expected value of $g\left(X\right)$ is

E\left[g\left(X\right)\right]=\sum _{x\in {\mathcal {X}}}g\left(x\right)\cdot p\left(x\right)

(3)

Consider the case where $g\left(x\right)=\log _{2}\left({\tfrac {1}{p\left(x\right)}}\right)$ . We get

E\left[\log _{2}\left({\tfrac {1}{p\left(x\right)}}\right)\right]=\sum _{x\in {\mathcal {X}}}\log _{2}\left({\tfrac {1}{p\left(x\right)}}\right)\cdot p\left(x\right)=-\sum _{x\in {\mathcal {X}}}p\left(x\right)\cdot \log _{2}p\left(x\right)=H\left(X\right)

(4)