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Conditional entropy - Wikipedia, the free encyclopedia

Conditional entropy

From Wikipedia, the free encyclopedia

The conditional entropy (or equivocation) is an entropy measure used in information theory. The conditional entropy measures how much entropy a random variable $Y$ has remaining if we have already learned completely the value of a second random variable $X$ . It is referred to as the entropy of $Y$ conditional on $X$ , and is written $H (Y | X)$ . Like other entropies, the conditional entropy is measured in bits.

Given random variables $X$ and $Y$ with entropies $H (X)$ and $H (Y)$ , and with a joint entropy $H (X, Y)$ , the conditional entropy of $Y$ given $X$ is defined as:

$H(Y|X) \equiv H(X,Y) - H(X)$ .

Intuitively, the combined system contains $H (X, Y)$ bits of information. If we learn the value of $X$ , we have gained $H (X)$ bits of information, and the system has $H (Y | X)$ bits remaining. $H (Y | X) = 0$ if and only if the value of $Y$ is completely determined by the value of $X$ . Conversely, $H (Y | X) = H (Y)$ if and only if $Y$ and $X$ are independent random variables.

In quantum information theory, the conditional entropy is generalized to the conditional quantum entropy.

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Categories: Entropy | Information theory

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