论文信息 - The Information Loss of a Stochastic Map

The Information Loss of a Stochastic Map

We provide a stochastic extension of the Baez–Fritz–Leinster characterization of the Shannon information loss associated with a measure-preserving function. This recovers the conditional entropy and a closely related information-theoretic measure that we call conditional information loss. Although not functorial, these information measures are semi-functorial, a concept we introduce that is definable in any Markov category. We also introduce the notion of an entropic Bayes’ rule for information measures, and we provide a characterization of conditional entropy in terms of this rule.

James Fullwood | Arthur J. Parzygnat | J. Fullwood

[1] Brendan Fong,et al. Causal Theories: A Categorical Perspective on Bayesian Networks , 2013, 1301.6201.

[2] Thomas M. Cover,et al. Elements of Information Theory (Wiley Series in Telecommunications and Signal Processing) , 2006 .

[3] S. Maclane,et al. Categories for the Working Mathematician , 1971 .

[4] Arthur J. Parzygnat. A functorial characterization of von Neumann entropy , 2020, ArXiv.

[5] Thomas M. Cover,et al. Elements of Information Theory , 2005 .

[6] P. Selinger. A Survey of Graphical Languages for Monoidal Categories , 2009, 0908.3347.

[7] Bart Jacobs,et al. Disintegration and Bayesian inversion via string diagrams , 2017, Mathematical Structures in Computer Science.

[9] Hsun-Hsien Chang. An Introduction to Error-Correcting Codes: From Classical to Quantum , 2006, quant-ph/0602157.

[10] F. Segal,et al. A CHARACTERIZATION OF FIBRANT SEGAL CATEGORIES , 2006, math/0603400.

[11] Tom Leinster,et al. A Characterization of Entropy in Terms of Information Loss , 2011, Entropy.

[12] T. Fritz. A synthetic approach to Markov kernels, conditional independence, and theorems on sufficient statistics , 2019, ArXiv.

[13] D. Gottesman. An Introduction to Quantum Error Correction , 2000, quant-ph/0004072.