Non-Asymptotic Analysis of Classical Spectrum Estimators for $L$-mixing Time-series Data with Estimated Means
Abstract
Spectral estimation is an important tool in time series analysis, with applications including economics, astronomy, and climatology.
The asymptotic theory for non-parametric estimation is well-known but the development of non-asymptotic theory is still ongoing.
Our recent work obtained the first non-asymptotic error bounds on the Bartlett and Welch methods with restrictive assumptions.
In this work, we derive non-asymptotic error bounds for both Bartlett and Welch estimators for $L$-mixing time-series data with unknown means, and the results cover the special case with known zero means.
The class of $L$-mixing processes contains common models in time series analysis, including autoregressive processes and measurements of geometrically ergodic Markov chains.
Our new error bounds are of $O(\frac{1}{\sqrt{k}})$, where $k$ is the number of data segments used in the algorithm.
Such bounds are the tightest among the existing work on non-asymptotic analysis of classical spectrum estimators with or without zero-mean assumptions.
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