On Probability Estimation by Exponential Smoothing
Information Theory
2015-01-12 v2 math.IT
Abstract
Probability estimation is essential for every statistical data compression algorithm. In practice probability estimation should be adaptive, recent observations should receive a higher weight than older observations. We present a probability estimation method based on exponential smoothing that satisfies this requirement and runs in constant time per letter. Our main contribution is a theoretical analysis in case of a binary alphabet for various smoothing rate sequences: We show that the redundancy w.r.t. a piecewise stationary model with segments is for any bit sequence of length , an improvement over redundancy of previous approaches with similar time complexity.
Cite
@article{arxiv.1501.01202,
title = {On Probability Estimation by Exponential Smoothing},
author = {Christopher Mattern},
journal= {arXiv preprint arXiv:1501.01202},
year = {2015}
}