Abstract
Spectral Analysis is one of the most important methods in signal processing. In practical application, it is critical to discuss the power spectral density estimation of finite data sampled from some stationary time series. A spectral estimator is expected to have good statistical properties such as consistency, high resolution and small variance. For one spectral estimation method, there exists a trade-off between high resolution and small variance. The paper provides a comparison of several popular spectral methods from both theoretical properties and practical applications. We first address several basic nonparametric methods, whose statistical characters are analysed. Then we explain the connections and differences between temporal windowing and lag windowing. Thereafter, the confidence intervals of both windows are given and used to evaluate the estimated results. Besides, several different parametric estimation methods of autoregressive time series are compared, and whose properties and effects are also introduced. Building on our understanding of these studies, we then apply parametric and nonparametric spectral estimation methods on the data of ocean surface wave height.
Highlights
Spectral analysis plays an important role in statistical signal processing and in estimation and detection of random signals
It is an important direction in the field of spectral analysis to develop a spectral density estimator with low variance and high resolution
For a stationary time series, we find that the parameters of the Y-W equation satisfying the AR(p) time series are the parameters of the best linear estimator when the autocorrelation sequence {sτ,τ = 1, p} is known
Summary
Spectral analysis plays an important role in statistical signal processing and in estimation and detection of random signals It is an important direction in the field of spectral analysis to develop a spectral density estimator with low variance and high resolution. As the Yule-Walker (Y-W) equation describes the relationship between correlation functions and parameters [12], the parametric estimation methods based on Y-W equation are widely used and extended. Different iterative algorithms, such as Levinson-Durbin (L-D) algorithm [13, 14], Delsarte-Genin algorithm [15], and maximum likelihood (ML) algorithm [16] are proposed for the study of the numerical solution for the Y-W equation
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