Title :
Generalized cutoff rates and Renyi´s information measures
Author_Institution :
Math. Inst., Hungarian Acad. of Sci., Budapest, Hungary
fDate :
1/1/1995 12:00:00 AM
Abstract :
Renyi´s (1961) entropy and divergence of order a are given operational characterizations in terms of block coding and hypothesis testing, as so-called β-cutoff rates, with α=(1+β)-1 for entropy and α=(1-β)-1 for divergence. Out of several possible definitions of mutual information and channel capacity of order α, our approach distinguishes one that admits an operational characterization as β-cutoff rate for channel coding, with α=(1-β)-1. The ordinary cutoff rate of a DMC corresponds to β=-1
Keywords :
block codes; channel capacity; channel coding; encoding; entropy; β-cutoff rates; Renyi´s information measures; block coding; channel capacity; channel coding; divergence; entropy; generalized cutoff rates; hypothesis testing; mutual information; Block codes; Books; Channel capacity; Channel coding; Entropy; Information theory; Mutual information; Q measurement; Terminology; Testing;
Journal_Title :
Information Theory, IEEE Transactions on
