Entropy (Nov 2011)

A Characterization of Entropy in Terms of Information Loss

  • Tom Leinster,
  • John C. Baez,
  • Tobias Fritz

DOI
https://doi.org/10.3390/e13111945
Journal volume & issue
Vol. 13, no. 11
pp. 1945 – 1957

Abstract

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There are numerous characterizations of Shannon entropy and Tsallis entropy as measures of information obeying certain properties. Using work by Faddeev and Furuichi, we derive a very simple characterization. Instead of focusing on the entropy of a probability measure on a finite set, this characterization focuses on the “information loss”, or change in entropy, associated with a measure-preserving function. Information loss is a special case of conditional entropy: namely, it is the entropy of a random variable conditioned on some function of that variable. We show that Shannon entropy gives the only concept of information loss that is functorial, convex-linear and continuous. This characterization naturally generalizes to Tsallis entropy as well.

Keywords