Data processing inequality

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The data processing inequality is an information theoretic concept that states that the information content of a signal cannot be increased via a local physical operation. This can be expressed concisely as 'post-processing cannot increase information'.[1]

Statement

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Let three random variables form the Markov chain  , implying that the conditional distribution of   depends only on   and is conditionally independent of  . Specifically, we have such a Markov chain if the joint probability mass function can be written as

 

In this setting, no processing of  , deterministic or random, can increase the information that   contains about  . Using the mutual information, this can be written as :

 

with the equality   if and only if  . That is,   and   contain the same information about  , and   also forms a Markov chain.[2]

Proof

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One can apply the chain rule for mutual information to obtain two different decompositions of  :

 

By the relationship  , we know that   and   are conditionally independent, given  , which means the conditional mutual information,  . The data processing inequality then follows from the non-negativity of  .

See also

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References

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  1. ^ Beaudry, Normand (2012), "An intuitive proof of the data processing inequality", Quantum Information & Computation, 12 (5–6): 432–441, arXiv:1107.0740, Bibcode:2011arXiv1107.0740B, doi:10.26421/QIC12.5-6-4, S2CID 9531510
  2. ^ Cover; Thomas (2012). Elements of information theory. John Wiley & Sons.
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