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

=== Applications ===

A python package for computing all multivariate joint entropies, mutual informations, conditional mutual information, total correlations, information distance in a dataset of n variables is available.<ref>{{cite web|url=https://infotopo.readthedocs.io/en/latest/index.html|title=InfoTopo: Topological Information Data Analysis. Deep statistical unsupervised and supervised learning - File Exchange - Github|website=github.com/pierrebaudot/infotopopy/|access-date=26 September 2020}}</ref>


==Joint differential entropy==
==Joint differential entropy==

Revision as of 18:56, 9 February 2021

A misleading[1] Venn diagram showing additive, and subtractive relationships between various information measures associated with correlated variables X and Y. The area contained by both circles is the joint entropy H(X,Y). The circle on the left (red and violet) is the individual entropy H(X), with the red being the conditional entropy H(X|Y). The circle on the right (blue and violet) is H(Y), with the blue being H(Y|X). The violet is the mutual information I(X;Y).

In information theory, joint entropy is a measure of the uncertainty associated with a set of variables.[2]

Definition

The joint Shannon entropy (in bits) of two discrete random variables and with images and is defined as[3]: 16 

(Eq.1)

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

For more than two random variables this expands to

(Eq.2)

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

Properties

Nonnegativity

The joint entropy of a set of random variables is a nonnegative number.

Greater than individual entropies

The joint entropy of a set of variables is greater than or equal to the maximum of 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.[3]: 30 

Relations to other entropy measures

Joint entropy is used in the definition of conditional entropy[3]: 22 

,

and It is also used in the definition of mutual information[3]: 21 

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

Joint differential entropy

Definition

The above definition is for discrete random variables and just as valid in the case of continuous random variables. The continuous version of discrete joint entropy is called joint differential (or continuous) entropy. Let and be a continuous random variables with a joint probability density function . The differential joint entropy is defined as[3]: 249 

(Eq.3)

For more than two continuous random variables the definition is generalized to:

(Eq.4)

The integral is taken over the support of . It is possible that the integral does not exist in which case we say that the differential entropy is not defined.

Properties

As in the discrete case the joint differential entropy of a set of random variables is smaller or equal than the sum of the entropies of the individual random variables:

[3]: 253 

The following chain rule holds for two random variables:

In the case of more than two random variables this generalizes to:[3]: 253 

Joint differential entropy is also used in the definition of the mutual information between continuous random variables:

References

  1. ^ D.J.C. Mackay. Information theory, inferences, and learning algorithms.: 141 
  2. ^ Theresa M. Korn; Korn, Granino Arthur. Mathematical Handbook for Scientists and Engineers: Definitions, Theorems, and Formulas for Reference and Review. New York: Dover Publications. ISBN 0-486-41147-8.
  3. ^ a b c d e f g Thomas M. Cover; Joy A. Thomas. Elements of Information Theory. Hoboken, New Jersey: Wiley. ISBN 0-471-24195-4.