A Novel Theoretical Framework for Exponential Smoothing
Abstract
Simple Exponential Smoothing is a classical technique used for smoothing time series data by assigning exponentially decreasing weights to past observations through a recursive equation; it is sometimes presented as a rule of thumb procedure. We introduce a novel theoretical perspective where the recursive equation that defines simple exponential smoothing occurs naturally as a stochastic gradient ascent scheme to optimize a sequence of Gaussian log-likelihood functions. Under this lens of analysis, our main theorem shows that -- in a general setting -- simple exponential smoothing converges to a neighborhood of the trend of a trend-stationary stochastic process. This offers a novel theoretical assurance that the exponential smoothing procedure yields reliable estimators of the underlying trend shedding light on long-standing observations in the literature regarding the robustness of simple exponential smoothing.
Cite
@article{arxiv.2403.04345,
title = {A Novel Theoretical Framework for Exponential Smoothing},
author = {Enrico Bernardi and Alberto Lanconelli and Christopher S. A. Lauria},
journal= {arXiv preprint arXiv:2403.04345},
year = {2024}
}
Comments
12 pages, 6 figures