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Joint entropy: Difference between revisions

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:<math>H(X,Y) \geq \min[H(X),H(Y)]</math>
:<math>H(X,Y) \geq \min[H(X),H(Y)]</math>


:<math>H(X_1, ..., X_n) \geq \max[H(X_1), ..., H(X_n)]</math>
:<math>H(X_1, ..., X_n) \geq \min[H(X_1), ..., H(X_n)]</math>


===Less than or equal to the sum of individual entropies===
===Less than or equal to the sum of individual entropies===

Revision as of 11:50, 1 October 2012

Individual (H(X),H(Y)), joint (H(X,Y)), and conditional entropies for a pair of correlated subsystems X,Y with mutual information I(X; Y).

Joint entropy is a measure of the uncertainty associated with a set of variables.

Definition

The joint entropy of two variables and is defined as

where and are particular values of and , respectively, is the probability of these values occurring together, and is defined to be 0 if .

For more than two variables this expands to

where are particular values of , respectively, is the probability of these values occurring together, and is defined to be 0 if .

Properties

Greater than individual entropies

The joint entropy of a set of variables is greater than or equal to all of the individual entropies of the variables in the set.

Less than or equal to the sum of individual entropies

The joint entropy of a set of variables is less than or equal to the sum of the individual entropies of the variables in the set. This is an example of subadditivity. This inequality is an equality if and only if and are statistically independent.

Relations to other entropy measures

Joint entropy is used in the definition of conditional entropy

and mutual information

In quantum information theory, the joint entropy is generalized into the joint quantum entropy.