Title :
Recurrence times and pointwise lower bounds in data compression
Author_Institution :
Inf. Syst. Lab., Stanford Univ., CA, USA
fDate :
29 Jun-4 Jul 1997
Abstract :
Let {Xt} be a stationary ergodic process with values in a finite alphabet 𝒳. For s⩽t let Xst=(X s,...,Xt). The first recurrence time of Xk =(X0,...,Xk-l is defined as the number of shifts back until Xk appears again. We give a simple proof using a lemma developed by Algoet and Cover (1985) to prove the asymptotic optimality of log-optimum selections in convex families
Keywords :
channel capacity; data compression; encoding; entropy; random processes; asymptotic optimality; code rates; convex families; data compression; entropy rate; finite alphabet; log-optimum selections; pointwise lower bounds; random variables; recurrence times; stationary ergodic process; Binary codes; Data compression; Databases; Entropy; Information systems; Investments; Random variables;
Conference_Titel :
Information Theory. 1997. Proceedings., 1997 IEEE International Symposium on
Conference_Location :
Ulm
Print_ISBN :
0-7803-3956-8
DOI :
10.1109/ISIT.1997.613241
