论文信息 - On the discontinuity of the Shannon information measures and typical sequences

On the discontinuity of the Shannon information measures and typical sequences

It is well known that the Shannon information measures are continuous functions of the probability distribution when the support is finite. This, however, does not hold when the support is countably infinite. In this paper, we investigate the continuity of the Shannon information measures for countably infinite support. With respect to a distance based on the Kullback-Liebler divergence, we use two different approaches to show that all the Shannon information measures are in fact discontinuous at all probability distributions with countably infinite support

Siu-Wai Ho

[1] Robert J. McEliece,et al. The Theory of Information and Coding , 1979 .

[2] Dominik Endres,et al. A new metric for probability distributions , 2003, IEEE Transactions on Information Theory.

[3] Sheldon M. Ross. Introduction to Probability Models. , 1995 .

[4] Flemming Topsøe,et al. Basic Concepts, Identities and Inequalities - the Toolkit of Information Theory , 2001, Entropy.

[5] R. Rucker. Infinity and the Mind: The Science and Philosophy of the Infinite , 1982 .

[6] R. A. Leibler,et al. On Information and Sufficiency , 1951 .

[7] A. Wehrl. General properties of entropy , 1978 .

[8] Raymond W. Yeung,et al. A First Course in Information Theory , 2002 .

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

[10] J. Lin,et al. A NEW DIRECTED DIVERGENCE MEASURE AND ITS CHARACTERIZATION , 1990 .

[11] Charles F. Hockett,et al. A mathematical theory of communication , 1948, MOCO.

[12] John D. Barrow. The Infinite Book: A Short Guide to the Boundless, Timeless and Endless , 2004 .