论文信息 - Renyi entropy, guesswork moments, and large deviations

Renyi entropy, guesswork moments, and large deviations

For a large class of stationary probability measures on A/sup N/, where A is a finite alphabet, we compute the specific Renyi entropy of order /spl alpha/ and the specific guesswork moments of order /spl beta/ > -1. We show that the specific guesswork moment of order /spl beta/ equals the specific Renyi entropy of order /spl alpha/ = 1 / (1 + /spl beta/) multiplied by /spl beta/. The method is based on energy-entropy estimates suggested by statistical physics. The technique also yields a simple proof of the large deviation principle for the empirical measure on the space of an irreducible sofic shift with reference probability measure /spl nu/, which is stationary and satisfies a rate condition on the probability of allowed words.

C. E. Pfister | W. G. Sullivan | W. Sullivan | C. Pfister

[1] W. Sullivan,et al. Billingsley dimension on shift spaces , 2003 .

[2] Erdal Arikan,et al. An upper bound on the cutoff rate of sequential decoding , 1988, IEEE Trans. Inf. Theory.

[3] Ronald L. Rivest,et al. The MD5 Message-Digest Algorithm , 1992, RFC.

[4] John T. Lewis,et al. Entropy, concentration of probability and conditional limit theorems , 1995 .

[5] B. Marcus. A note on periodic points for ergodic toral automorphisms , 1980 .

[6] John T. Lewis,et al. Reconstruction sequences and equipartition measures: An examination of the asymptotic equipartition property , 1997, IEEE Trans. Inf. Theory.

[7] Erdal Arikan. An inequality on guessing and its application to sequential decoding , 1996, IEEE Trans. Inf. Theory.

[8] J. D. Biggins,et al. Large Deviation Techniques, and Applications , 1994 .

[9] Large deviations for ℤd-Actions , 1994 .

[10] David Malone,et al. Guesswork and entropy , 2004, IEEE Transactions on Information Theory.

[11] A. Dembo,et al. Large Deviation Techniques and Applications. , 1994 .