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TIT
2010

Information inequalities for joint distributions, with interpretations and applications

13 years 7 months ago
Information inequalities for joint distributions, with interpretations and applications
Upper and lower bounds are obtained for the joint entropy of a collection of random variables in terms of an arbitrary collection of subset joint entropies. These inequalities generalize Shannon's chain rule for entropy as well as inequalities of Han, Fujishige, and Shearer. A duality between the upper and lower bounds for joint entropy is developed. All of these results are shown to be special cases of general, new results for submodular functions--thus, the inequalities presented constitute a richly structured class of Shannon-type inequalities. The new inequalities are applied to obtain new results in combinatorics, such as bounds on the number of independent sets in an arbitrary graph and the number of zero-error source-channel codes, as well as determinantal inequalities in matrix theory. A general inequality for relative entropies is also developed. Finally, revealing connections of the results to literature in economics, computer science, and physics are explored.
Mokshay M. Madiman, Prasad Tetali
Added 22 May 2011
Updated 22 May 2011
Type Journal
Year 2010
Where TIT
Authors Mokshay M. Madiman, Prasad Tetali
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