On Probability Estimation by Exponential Smoothing

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 s segments is O(s n) for any bit sequence of length n, an improvement over redundancy O(sn n) of previous approaches with similar time complexity.