Title :
A strong version of the redundancy-capacity theorem of universal coding
Author :
Merhav, Neri ; Feder, Meir
Author_Institution :
Dept. of Electr. Eng., Technion-Israel Inst. of Technol., Haifa, Israel
fDate :
5/1/1995 12:00:00 AM
Abstract :
The capacity of the channel induced by a given class of sources is well known to be an attainable lower bound on the redundancy of universal codes with respect to this class, both in the minimax sense and in the Bayesian (maximin) sense. We show that this capacity is essentially a lower bound also in a stronger sense, that is, for “most” sources in the class. This result extends Rissanen´s (1984, 1986) lower bound for parametric families. We demonstrate the applicability of this result in several examples, e.g., parametric families with growing dimensionality, piecewise-fixed sources, arbitrarily varying sources, and noisy samples of learnable functions. Finally, we discuss implications of our results to statistical inference
Keywords :
Bayes methods; channel capacity; minimax techniques; redundancy; source coding; statistical analysis; Bayesian maximin sense; channel capacity; learnable functions; lower bound; noisy samples; parametric families; piecewise-fixed sources; random coding; redundancy-capacity theorem; source coding; statistical inference; universal coding; varying sources; Bayesian methods; Channel capacity; Conferences; Data compression; Entropy; Information theory; Minimax techniques; Probability distribution; Random variables; Source coding;
Journal_Title :
Information Theory, IEEE Transactions on
